(deftransform complement ((fun) * * :node node :when :both)
"open code"
(multiple-value-bind (min max)
- (function-type-nargs (continuation-type fun))
+ (fun-type-nargs (continuation-type fun))
(cond
((and min (eql min max))
(let ((dums (make-gensym-list min)))
\f
;;;; list hackery
-;;; Translate CxxR into CAR/CDR combos.
-
+;;; Translate CxR into CAR/CDR combos.
(defun source-transform-cxr (form)
- (if (or (byte-compiling) (/= (length form) 2))
+ (if (/= (length form) 2)
(values nil t)
(let ((name (symbol-name (car form))))
(do ((i (- (length name) 2) (1- i))
,res)))
((zerop i) res)))))
-(do ((i 2 (1+ i))
- (b '(1 0) (cons i b)))
- ((= i 5))
- (dotimes (j (ash 1 i))
- (setf (info :function :source-transform
- (intern (format nil "C~{~:[A~;D~]~}R"
- (mapcar #'(lambda (x) (logbitp x j)) b))))
- #'source-transform-cxr)))
+;;; Make source transforms to turn CxR forms into combinations of CAR
+;;; and CDR. ANSI specifies that everything up to 4 A/D operations is
+;;; defined.
+(/show0 "about to set CxR source transforms")
+(loop for i of-type index from 2 upto 4 do
+ ;; Iterate over BUF = all names CxR where x = an I-element
+ ;; string of #\A or #\D characters.
+ (let ((buf (make-string (+ 2 i))))
+ (setf (aref buf 0) #\C
+ (aref buf (1+ i)) #\R)
+ (dotimes (j (ash 2 i))
+ (declare (type index j))
+ (dotimes (k i)
+ (declare (type index k))
+ (setf (aref buf (1+ k))
+ (if (logbitp k j) #\A #\D)))
+ (setf (info :function :source-transform (intern buf))
+ #'source-transform-cxr))))
+(/show0 "done setting CxR source transforms")
;;; Turn FIRST..FOURTH and REST into the obvious synonym, assuming
;;; whatever is right for them is right for us. FIFTH..TENTH turn into
;;; Note that all the integer division functions are available for
;;; inline expansion.
-;;; FIXME: DEF-FROB instead of FROB
-(macrolet ((frob (fun)
+(macrolet ((deffrob (fun)
`(def-source-transform ,fun (x &optional (y nil y-p))
(declare (ignore y))
(if y-p
(values nil t)
`(,',fun ,x 1)))))
- (frob truncate)
- (frob round)
- #!+propagate-float-type
- (frob floor)
- #!+propagate-float-type
- (frob ceiling))
+ (deffrob truncate)
+ (deffrob round)
+ #-sb-xc-host ; (See CROSS-FLOAT-INFINITY-KLUDGE.)
+ (deffrob floor)
+ #-sb-xc-host ; (See CROSS-FLOAT-INFINITY-KLUDGE.)
+ (deffrob ceiling))
(def-source-transform lognand (x y) `(lognot (logand ,x ,y)))
(def-source-transform lognor (x y) `(lognot (logior ,x ,y)))
(%denominator ,n-num)
1)))
\f
-;;;; Interval arithmetic for computing bounds
-;;;; (toy@rtp.ericsson.se)
+;;;; interval arithmetic for computing bounds
;;;;
;;;; This is a set of routines for operating on intervals. It
;;;; implements a simple interval arithmetic package. Although SBCL
-;;;; has an interval type in numeric-type, we choose to use our own
+;;;; has an interval type in NUMERIC-TYPE, we choose to use our own
;;;; for two reasons:
;;;;
-;;;; 1. This package is simpler than numeric-type
+;;;; 1. This package is simpler than NUMERIC-TYPE.
;;;;
;;;; 2. It makes debugging much easier because you can just strip
-;;;; out these routines and test them independently of SBCL. (a
+;;;; out these routines and test them independently of SBCL. (This is a
;;;; big win!)
;;;;
;;;; One disadvantage is a probable increase in consing because we
;;;; numeric-type has everything we want to know. Reason 2 wins for
;;;; now.
-#-sb-xc-host ;(CROSS-FLOAT-INFINITY-KLUDGE, see base-target-features.lisp-expr)
-(progn
-#!+propagate-float-type
-(progn
-
;;; The basic interval type. It can handle open and closed intervals.
;;; A bound is open if it is a list containing a number, just like
;;; Lisp says. NIL means unbounded.
-(defstruct (interval
- (:constructor %make-interval))
+(defstruct (interval (:constructor %make-interval)
+ (:copier nil))
low high)
(defun make-interval (&key low high)
(labels ((normalize-bound (val)
(cond ((and (floatp val)
(float-infinity-p val))
- ;; Handle infinities
+ ;; Handle infinities.
nil)
((or (numberp val)
(eq val nil))
- ;; Handle any closed bounds
+ ;; Handle any closed bounds.
val)
((listp val)
;; We have an open bound. Normalize the numeric
;; bound is really unbounded, so drop the openness.
(let ((new-val (normalize-bound (first val))))
(when new-val
- ;; Bound exists, so keep it open still
+ ;; The bound exists, so keep it open still.
(list new-val))))
(t
- (error "Unknown bound type in make-interval!")))))
+ (error "unknown bound type in MAKE-INTERVAL")))))
(%make-interval :low (normalize-bound low)
:high (normalize-bound high))))
-#!-sb-fluid (declaim (inline bound-value set-bound))
-
-;;; Extract the numeric value of a bound. Return NIL, if X is NIL.
-(defun bound-value (x)
- (if (consp x) (car x) x))
-
;;; Given a number X, create a form suitable as a bound for an
;;; interval. Make the bound open if OPEN-P is T. NIL remains NIL.
+#!-sb-fluid (declaim (inline set-bound))
(defun set-bound (x open-p)
(if (and x open-p) (list x) x))
;; With these traps masked, we might get things like infinity
;; or negative infinity returned. Check for this and return
;; NIL to indicate unbounded.
- (let ((y (funcall f (bound-value x))))
+ (let ((y (funcall f (type-bound-number x))))
(if (and (floatp y)
(float-infinity-p y))
nil
- (set-bound (funcall f (bound-value x)) (consp x)))))))
+ (set-bound (funcall f (type-bound-number x)) (consp x)))))))
;;; Apply a binary operator OP to two bounds X and Y. The result is
;;; NIL if either is NIL. Otherwise bound is computed and the result
(defmacro bound-binop (op x y)
`(and ,x ,y
(with-float-traps-masked (:underflow :overflow :inexact :divide-by-zero)
- (set-bound (,op (bound-value ,x)
- (bound-value ,y))
+ (set-bound (,op (type-bound-number ,x)
+ (type-bound-number ,y))
(or (consp ,x) (consp ,y))))))
-;;; NUMERIC-TYPE->INTERVAL
-;;;
;;; Convert a numeric-type object to an interval object.
-
(defun numeric-type->interval (x)
(declare (type numeric-type x))
(make-interval :low (numeric-type-low x)
(make-interval :low (copy-interval-limit (interval-low x))
:high (copy-interval-limit (interval-high x))))
-;;; INTERVAL-SPLIT
-;;;
;;; Given a point P contained in the interval X, split X into two
;;; interval at the point P. If CLOSE-LOWER is T, then the left
;;; interval contains P. If CLOSE-UPPER is T, the right interval
(make-interval :low (if close-upper (list p) p)
:high (copy-interval-limit (interval-high x)))))
-;;; INTERVAL-CLOSURE
-;;;
;;; Return the closure of the interval. That is, convert open bounds
;;; to closed bounds.
(defun interval-closure (x)
(declare (type interval x))
- (make-interval :low (bound-value (interval-low x))
- :high (bound-value (interval-high x))))
+ (make-interval :low (type-bound-number (interval-low x))
+ :high (type-bound-number (interval-high x))))
(defun signed-zero->= (x y)
(declare (real x y))
(>= (float-sign (float x))
(float-sign (float y))))))
-;;; INTERVAL-RANGE-INFO
-;;;
;;; For an interval X, if X >= POINT, return '+. If X <= POINT, return
;;; '-. Otherwise return NIL.
#+nil
(declare (type interval x))
(let ((lo (interval-low x))
(hi (interval-high x)))
- (cond ((and lo (signed-zero->= (bound-value lo) point))
+ (cond ((and lo (signed-zero->= (type-bound-number lo) point))
'+)
- ((and hi (signed-zero->= point (bound-value hi)))
+ ((and hi (signed-zero->= point (type-bound-number hi)))
'-)
(t
nil))))
(>= x y))))
(let ((lo (interval-low x))
(hi (interval-high x)))
- (cond ((and lo (signed->= (bound-value lo) point))
+ (cond ((and lo (signed->= (type-bound-number lo) point))
'+)
- ((and hi (signed->= point (bound-value hi)))
+ ((and hi (signed->= point (type-bound-number hi)))
'-)
(t
nil)))))
-;;; INTERVAL-BOUNDED-P
-;;;
;;; Test to see whether the interval X is bounded. HOW determines the
;;; test, and should be either ABOVE, BELOW, or BOTH.
(defun interval-bounded-p (x how)
('both
(and (interval-low x) (interval-high x)))))
-;;; Signed zero comparison functions. Use these functions if we need
+;;; signed zero comparison functions. Use these functions if we need
;;; to distinguish between signed zeroes.
-
(defun signed-zero-< (x y)
(declare (real x y))
(or (< x y)
(and (= x y)
(> (float-sign (float x))
(float-sign (float y))))))
-
(defun signed-zero-= (x y)
(declare (real x y))
(and (= x y)
(= (float-sign (float x))
(float-sign (float y)))))
-
(defun signed-zero-<= (x y)
(declare (real x y))
(or (< x y)
(<= (float-sign (float x))
(float-sign (float y))))))
-;;; INTERVAL-CONTAINS-P
-;;;
-;;; See whether the interval X contains the number P, taking into account
-;;; that the interval might not be closed.
+;;; See whether the interval X contains the number P, taking into
+;;; account that the interval might not be closed.
(defun interval-contains-p (p x)
(declare (type number p)
(type interval x))
(hi (interval-high x)))
(cond ((and lo hi)
;; The interval is bounded
- (if (and (signed-zero-<= (bound-value lo) p)
- (signed-zero-<= p (bound-value hi)))
+ (if (and (signed-zero-<= (type-bound-number lo) p)
+ (signed-zero-<= p (type-bound-number hi)))
;; P is definitely in the closure of the interval.
;; We just need to check the end points now.
- (cond ((signed-zero-= p (bound-value lo))
+ (cond ((signed-zero-= p (type-bound-number lo))
(numberp lo))
- ((signed-zero-= p (bound-value hi))
+ ((signed-zero-= p (type-bound-number hi))
(numberp hi))
(t t))
nil))
(hi
;; Interval with upper bound
- (if (signed-zero-< p (bound-value hi))
+ (if (signed-zero-< p (type-bound-number hi))
t
(and (numberp hi) (signed-zero-= p hi))))
(lo
;; Interval with lower bound
- (if (signed-zero-> p (bound-value lo))
+ (if (signed-zero-> p (type-bound-number lo))
t
(and (numberp lo) (signed-zero-= p lo))))
(t
;; Interval with no bounds
t))))
-;;; INTERVAL-INTERSECT-P
-;;;
-;;; Determine if two intervals X and Y intersect. Return T if so. If
-;;; CLOSED-INTERVALS-P is T, the treat the intervals as if they were
-;;; closed. Otherwise the intervals are treated as they are.
+;;; Determine whether two intervals X and Y intersect. Return T if so.
+;;; If CLOSED-INTERVALS-P is T, the treat the intervals as if they
+;;; were closed. Otherwise the intervals are treated as they are.
;;;
;;; Thus if X = [0, 1) and Y = (1, 2), then they do not intersect
;;; because no element in X is in Y. However, if CLOSED-INTERVALS-P
(flet ((adjacent (lo hi)
;; Check to see whether lo and hi are adjacent. If either is
;; nil, they can't be adjacent.
- (when (and lo hi (= (bound-value lo) (bound-value hi)))
+ (when (and lo hi (= (type-bound-number lo) (type-bound-number hi)))
;; The bounds are equal. They are adjacent if one of
;; them is closed (a number). If both are open (consp),
;; then there is a number that lies between them.
(or (adjacent (interval-low y) (interval-high x))
(adjacent (interval-low x) (interval-high y)))))
-;;; INTERVAL-INTERSECTION/DIFFERENCE
-;;;
;;; Compute the intersection and difference between two intervals.
;;; Two values are returned: the intersection and the difference.
;;;
(list p)))
(test-number (p int)
;; Test whether P is in the interval.
- (when (interval-contains-p (bound-value p)
+ (when (interval-contains-p (type-bound-number p)
(interval-closure int))
(let ((lo (interval-low int))
(hi (interval-high int)))
- ;; Check for endpoints
- (cond ((and lo (= (bound-value p) (bound-value lo)))
+ ;; Check for endpoints.
+ (cond ((and lo (= (type-bound-number p) (type-bound-number lo)))
(not (and (consp p) (numberp lo))))
- ((and hi (= (bound-value p) (bound-value hi)))
+ ((and hi (= (type-bound-number p) (type-bound-number hi)))
(not (and (numberp p) (consp hi))))
(t t)))))
(test-lower-bound (p int)
(test-number p int)
(not (interval-bounded-p int 'below))))
(test-upper-bound (p int)
- ;; P is an upper bound of an interval
+ ;; P is an upper bound of an interval.
(if p
(test-number p int)
(not (interval-bounded-p int 'above)))))
(y-hi-in-x
(values y-hi (opposite-bound y-hi) x-hi)))
(values (make-interval :low lo :high hi)
- (list (make-interval :low left-lo :high left-hi)
- (make-interval :low right-lo :high right-hi))))))
+ (list (make-interval :low left-lo
+ :high left-hi)
+ (make-interval :low right-lo
+ :high right-hi))))))
(t
(values nil (list x y))))))))
-;;; INTERVAL-MERGE-PAIR
-;;;
;;; If intervals X and Y intersect, return a new interval that is the
;;; union of the two. If they do not intersect, return NIL.
(defun interval-merge-pair (x y)
(when (or (interval-intersect-p x y)
(interval-adjacent-p x y))
(flet ((select-bound (x1 x2 min-op max-op)
- (let ((x1-val (bound-value x1))
- (x2-val (bound-value x2)))
+ (let ((x1-val (type-bound-number x1))
+ (x2-val (type-bound-number x2)))
(cond ((and x1 x2)
;; Both bounds are finite. Select the right one.
(cond ((funcall min-op x1-val x2-val)
- ;; x1 definitely better
+ ;; x1 is definitely better.
x1)
((funcall max-op x1-val x2-val)
- ;; x2 definitely better
+ ;; x2 is definitely better.
x2)
(t
;; Bounds are equal. Select either
(make-interval :low (select-bound x-lo y-lo #'< #'>)
:high (select-bound x-hi y-hi #'> #'<))))))
-;;; Basic arithmetic operations on intervals. We probably should do
+;;; basic arithmetic operations on intervals. We probably should do
;;; true interval arithmetic here, but it's complicated because we
;;; have float and integer types and bounds can be open or closed.
-;;; INTERVAL-NEG
-;;;
-;;; The negative of an interval
+;;; the negative of an interval
(defun interval-neg (x)
(declare (type interval x))
(make-interval :low (bound-func #'- (interval-high x))
:high (bound-func #'- (interval-low x))))
-;;; INTERVAL-ADD
-;;;
-;;; Add two intervals
+;;; Add two intervals.
(defun interval-add (x y)
(declare (type interval x y))
(make-interval :low (bound-binop + (interval-low x) (interval-low y))
:high (bound-binop + (interval-high x) (interval-high y))))
-;;; INTERVAL-SUB
-;;;
-;;; Subtract two intervals
+;;; Subtract two intervals.
(defun interval-sub (x y)
(declare (type interval x y))
(make-interval :low (bound-binop - (interval-low x) (interval-high y))
:high (bound-binop - (interval-high x) (interval-low y))))
-;;; INTERVAL-MUL
-;;;
-;;; Multiply two intervals
+;;; Multiply two intervals.
(defun interval-mul (x y)
(declare (type interval x y))
(flet ((bound-mul (x y)
;; is always a closed bound. But don't replace this
;; with zero; we want the multiplication to produce
;; the correct signed zero, if needed.
- (* (bound-value x) (bound-value y)))
+ (* (type-bound-number x) (type-bound-number y)))
((or (and (floatp x) (float-infinity-p x))
(and (floatp y) (float-infinity-p y)))
;; Infinity times anything is infinity
((eq y-range '-)
(interval-neg (interval-mul x (interval-neg y))))
((and (eq x-range '+) (eq y-range '+))
- ;; If we are here, X and Y are both positive
- (make-interval :low (bound-mul (interval-low x) (interval-low y))
- :high (bound-mul (interval-high x) (interval-high y))))
+ ;; If we are here, X and Y are both positive.
+ (make-interval
+ :low (bound-mul (interval-low x) (interval-low y))
+ :high (bound-mul (interval-high x) (interval-high y))))
(t
- (error "This shouldn't happen!"))))))
+ (error "internal error in INTERVAL-MUL"))))))
-;;; INTERVAL-DIV
-;;;
;;; Divide two intervals.
(defun interval-div (top bot)
(declare (type interval top bot))
;; we need to watch out for the sign of the result,
;; to correctly handle signed zeros. We also need
;; to watch out for positive or negative infinity.
- (if (floatp (bound-value x))
+ (if (floatp (type-bound-number x))
(if y-low-p
- (- (float-sign (bound-value x) 0.0))
- (float-sign (bound-value x) 0.0))
+ (- (float-sign (type-bound-number x) 0.0))
+ (float-sign (type-bound-number x) 0.0))
0))
- ((zerop (bound-value y))
+ ((zerop (type-bound-number y))
;; Divide by zero means result is infinity
nil)
((and (numberp x) (zerop x))
;; sign of the result.
(interval-neg (interval-div (interval-neg top) bot)))
((and (eq top-range '+) (eq bot-range '+))
- ;; The easy case
- (make-interval :low (bound-div (interval-low top) (interval-high bot) t)
- :high (bound-div (interval-high top) (interval-low bot) nil)))
+ ;; the easy case
+ (make-interval
+ :low (bound-div (interval-low top) (interval-high bot) t)
+ :high (bound-div (interval-high top) (interval-low bot) nil)))
(t
- (error "This shouldn't happen!"))))))
+ (error "internal error in INTERVAL-DIV"))))))
-;;; INTERVAL-FUNC
-;;;
;;; Apply the function F to the interval X. If X = [a, b], then the
;;; result is [f(a), f(b)]. It is up to the user to make sure the
;;; result makes sense. It will if F is monotonic increasing (or
(hi (bound-func f (interval-high x))))
(make-interval :low lo :high hi)))
-;;; INTERVAL-<
-;;;
;;; Return T if X < Y. That is every number in the interval X is
;;; always less than any number in the interval Y.
(defun interval-< (x y)
;; don't overlap.
(let ((left (interval-high x))
(right (interval-low y)))
- (cond ((> (bound-value left)
- (bound-value right))
- ;; Definitely overlap so result is NIL
+ (cond ((> (type-bound-number left)
+ (type-bound-number right))
+ ;; The intervals definitely overlap, so result is NIL.
nil)
- ((< (bound-value left)
- (bound-value right))
- ;; Definitely don't touch, so result is T
+ ((< (type-bound-number left)
+ (type-bound-number right))
+ ;; The intervals definitely don't touch, so result is T.
t)
(t
;; Limits are equal. Check for open or closed bounds.
;; Don't overlap if one or the other are open.
(or (consp left) (consp right)))))))
-;;; INVTERVAL->=
-;;;
;;; Return T if X >= Y. That is, every number in the interval X is
;;; always greater than any number in the interval Y.
(defun interval->= (x y)
;; X >= Y if lower bound of X >= upper bound of Y
(when (and (interval-bounded-p x 'below)
(interval-bounded-p y 'above))
- (>= (bound-value (interval-low x)) (bound-value (interval-high y)))))
+ (>= (type-bound-number (interval-low x))
+ (type-bound-number (interval-high y)))))
-;;; INTERVAL-ABS
-;;;
-;;; Return an interval that is the absolute value of X. Thus, if X =
-;;; [-1 10], the result is [0, 10].
+;;; Return an interval that is the absolute value of X. Thus, if
+;;; X = [-1 10], the result is [0, 10].
(defun interval-abs (x)
(declare (type interval x))
(case (interval-range-info x)
(destructuring-bind (x- x+) (interval-split 0 x t t)
(interval-merge-pair (interval-neg x-) x+)))))
-;;; INTERVAL-SQR
-;;;
;;; Compute the square of an interval.
(defun interval-sqr (x)
(declare (type interval x))
- (interval-func #'(lambda (x) (* x x))
+ (interval-func (lambda (x) (* x x))
(interval-abs x)))
-)) ; end PROGN's
\f
-;;;; numeric derive-type methods
+;;;; numeric DERIVE-TYPE methods
-;;; Utility for defining derive-type methods of integer operations. If the
-;;; types of both X and Y are integer types, then we compute a new integer type
-;;; with bounds determined Fun when applied to X and Y. Otherwise, we use
-;;; Numeric-Contagion.
+;;; a utility for defining derive-type methods of integer operations. If
+;;; the types of both X and Y are integer types, then we compute a new
+;;; integer type with bounds determined Fun when applied to X and Y.
+;;; Otherwise, we use Numeric-Contagion.
(defun derive-integer-type (x y fun)
(declare (type continuation x y) (type function fun))
(let ((x (continuation-type x))
:high high))
(numeric-contagion x y))))
-#!+(or propagate-float-type propagate-fun-type)
-(progn
-
-;; Simple utility to flatten a list
+;;; simple utility to flatten a list
(defun flatten-list (x)
(labels ((flatten-helper (x r);; 'r' is the stuff to the 'right'.
(cond ((null x) r)
new-args)))))
;;; Convert from the standard type convention for which -0.0 and 0.0
-;;; and equal to an intermediate convention for which they are
+;;; are equal to an intermediate convention for which they are
;;; considered different which is more natural for some of the
;;; optimisers.
#!-negative-zero-is-not-zero
;;; Only convert real float interval delimiters types.
(if (eq (numeric-type-complexp type) :real)
(let* ((lo (numeric-type-low type))
- (lo-val (bound-value lo))
+ (lo-val (type-bound-number lo))
(lo-float-zero-p (and lo (floatp lo-val) (= lo-val 0.0)))
(hi (numeric-type-high type))
- (hi-val (bound-value hi))
+ (hi-val (type-bound-number hi))
(hi-float-zero-p (and hi (floatp hi-val) (= hi-val 0.0))))
(if (or lo-float-zero-p hi-float-zero-p)
(make-numeric-type
;;; Only convert real float interval delimiters types.
(if (eq (numeric-type-complexp type) :real)
(let* ((lo (numeric-type-low type))
- (lo-val (bound-value lo))
+ (lo-val (type-bound-number lo))
(lo-float-zero-p
(and lo (floatp lo-val) (= lo-val 0.0)
(float-sign lo-val)))
(hi (numeric-type-high type))
- (hi-val (bound-value hi))
+ (hi-val (type-bound-number hi))
(hi-float-zero-p
(and hi (floatp hi-val) (= hi-val 0.0)
(float-sign hi-val))))
;; (float +0.0 +0.0) => (member 0.0)
;; (float -0.0 -0.0) => (member -0.0)
((and lo-float-zero-p hi-float-zero-p)
- ;; Shouldn't have exclusive bounds here.
- (assert (and (not (consp lo)) (not (consp hi))))
+ ;; shouldn't have exclusive bounds here..
+ (aver (and (not (consp lo)) (not (consp hi))))
(if (= lo-float-zero-p hi-float-zero-p)
;; (float +0.0 +0.0) => (member 0.0)
;; (float -0.0 -0.0) => (member -0.0)
:high (list (float 0.0 hi-val)))))))
(t
type)))
- ;; Not real float.
+ ;; not real float
type))
;;; Convert back a possible list of numeric types.
(t
type-list)))
-;;; Make-Canonical-Union-Type
-;;;
+;;; FIXME: MAKE-CANONICAL-UNION-TYPE and CONVERT-MEMBER-TYPE probably
+;;; belong in the kernel's type logic, invoked always, instead of in
+;;; the compiler, invoked only during some type optimizations.
+
;;; Take a list of types and return a canonical type specifier,
-;;; combining any members types together. If both positive and
-;;; negative members types are present they are converted to a float
-;;; type. X This would be far simpler if the type-union methods could
-;;; handle member/number unions.
+;;; combining any MEMBER types together. If both positive and negative
+;;; MEMBER types are present they are converted to a float type.
+;;; XXX This would be far simpler if the type-union methods could handle
+;;; member/number unions.
(defun make-canonical-union-type (type-list)
(let ((members '())
(misc-types '()))
#!+negative-zero-is-not-zero
(push (specifier-type '(single-float -0f0 0f0)) misc-types)
(setf members (set-difference members '(-0f0 0f0))))
- (cond ((null members)
- (let ((res (first misc-types)))
- (dolist (type (rest misc-types))
- (setq res (type-union res type)))
- res))
- ((null misc-types)
- (make-member-type :members members))
- (t
- (let ((res (first misc-types)))
- (dolist (type (rest misc-types))
- (setq res (type-union res type)))
- (dolist (type members)
- (setq res (type-union
- res (make-member-type :members (list type)))))
- res)))))
-
-;;; Convert-Member-Type
-;;;
+ (if members
+ (apply #'type-union (make-member-type :members members) misc-types)
+ (apply #'type-union misc-types))))
+
;;; Convert a member type with a single member to a numeric type.
(defun convert-member-type (arg)
(let* ((members (member-type-members arg))
(member (first members))
(member-type (type-of member)))
- (assert (not (rest members)))
+ (aver (not (rest members)))
(specifier-type `(,(if (subtypep member-type 'integer)
'integer
member-type)
,member ,member))))
-;;; ONE-ARG-DERIVE-TYPE
-;;;
;;; This is used in defoptimizers for computing the resulting type of
;;; a function.
;;;
(make-canonical-union-type results)
(first results)))))))
-;;; TWO-ARG-DERIVE-TYPE
-;;;
;;; Same as ONE-ARG-DERIVE-TYPE, except we assume the function takes
;;; two arguments. DERIVE-FCN takes 3 args in this case: the two
;;; original args and a third which is T to indicate if the two args
(funcall fcn x y))))
(cond ((null result))
((and (floatp result) (float-nan-p result))
- (make-numeric-type
- :class 'float
- :format (type-of result)
- :complexp :real))
+ (make-numeric-type :class 'float
+ :format (type-of result)
+ :complexp :real))
(t
(make-member-type :members (list result))))))
((and (member-type-p x) (numeric-type-p y))
(if (rest results)
(make-canonical-union-type results)
(first results)))))))
-
-) ; PROGN
\f
-#!-propagate-float-type
+#+sb-xc-host ; (See CROSS-FLOAT-INFINITY-KLUDGE.)
(progn
(defoptimizer (+ derive-type) ((x y))
(derive-integer-type
) ; PROGN
-#!+propagate-float-type
+#-sb-xc-host ; (See CROSS-FLOAT-INFINITY-KLUDGE.)
(progn
(defun +-derive-type-aux (x y same-arg)
(if (and (numeric-type-real-p x)
(make-numeric-type
:class (if (and (eq (numeric-type-class x) 'integer)
(eq (numeric-type-class y) 'integer))
- ;; The sum of integers is always an integer
+ ;; The sum of integers is always an integer.
'integer
(numeric-type-class result-type))
:format (numeric-type-format result-type)
:low (interval-low result)
:high (interval-high result)))
- ;; General contagion
+ ;; general contagion
(numeric-contagion x y)))
(defoptimizer (+ derive-type) ((x y))
(if (and (numeric-type-real-p x)
(numeric-type-real-p y))
(let ((result
- ;; (- x x) is always 0.
+ ;; (- X X) is always 0.
(if same-arg
(make-interval :low 0 :high 0)
(interval-sub (numeric-type->interval x)
(make-numeric-type
:class (if (and (eq (numeric-type-class x) 'integer)
(eq (numeric-type-class y) 'integer))
- ;; The difference of integers is always an integer
+ ;; The difference of integers is always an integer.
'integer
(numeric-type-class result-type))
:format (numeric-type-format result-type)
:low (interval-low result)
:high (interval-high result)))
- ;; General contagion
+ ;; general contagion
(numeric-contagion x y)))
(defoptimizer (- derive-type) ((x y))
(if (and (numeric-type-real-p x)
(numeric-type-real-p y))
(let ((result
- ;; (* x x) is always positive, so take care to do it
- ;; right.
+ ;; (* X X) is always positive, so take care to do it right.
(if same-arg
(interval-sqr (numeric-type->interval x))
(interval-mul (numeric-type->interval x)
(make-numeric-type
:class (if (and (eq (numeric-type-class x) 'integer)
(eq (numeric-type-class y) 'integer))
- ;; The product of integers is always an integer
+ ;; The product of integers is always an integer.
'integer
(numeric-type-class result-type))
:format (numeric-type-format result-type)
(if (and (numeric-type-real-p x)
(numeric-type-real-p y))
(let ((result
- ;; (/ x x) is always 1, except if x can contain 0. In
+ ;; (/ X X) is always 1, except if X can contain 0. In
;; that case, we shouldn't optimize the division away
;; because we want 0/0 to signal an error.
(if (and same-arg
) ; PROGN
-;;; ASH derive type optimizer
-;;;
-;;; Large resulting bounds are easy to generate but are not
-;;; particularly useful, so an open outer bound is returned for a
-;;; shift greater than 64 - the largest word size of any of the ports.
-;;; Large negative shifts are also problematic as the ASH
-;;; implementation only accepts shifts greater than
-;;; MOST-NEGATIVE-FIXNUM. These issues are handled by two local
-;;; functions:
-;;; ASH-OUTER: Perform the shift when within an acceptable range,
-;;; otherwise return an open bound.
-;;; ASH-INNER: Perform the shift when within range, limited to a
-;;; maximum of 64, otherwise returns the inner limit.
-;;;
;;; KLUDGE: All this ASH optimization is suppressed under CMU CL
;;; because as of version 2.4.6 for Debian, CMU CL blows up on (ASH
;;; 1000000000 -100000000000) (i.e. ASH of two bignums yielding zero)
;;; and it's hard to avoid that calculation in here.
#-(and cmu sb-xc-host)
(progn
-#!-propagate-fun-type
-(defoptimizer (ash derive-type) ((n shift))
- (flet ((ash-outer (n s)
- (when (and (target-fixnump s)
- (<= s 64)
- (> s sb!vm:*target-most-negative-fixnum*))
- (ash n s)))
- (ash-inner (n s)
- (if (and (target-fixnump s)
- (> s sb!vm:*target-most-negative-fixnum*))
- (ash n (min s 64))
- (if (minusp n) -1 0))))
- (or (let ((n-type (continuation-type n)))
- (when (numeric-type-p n-type)
- (let ((n-low (numeric-type-low n-type))
- (n-high (numeric-type-high n-type)))
- (if (constant-continuation-p shift)
- (let ((shift (continuation-value shift)))
- (make-numeric-type :class 'integer
- :complexp :real
- :low (when n-low (ash n-low shift))
- :high (when n-high (ash n-high shift))))
- (let ((s-type (continuation-type shift)))
- (when (numeric-type-p s-type)
- (let* ((s-low (numeric-type-low s-type))
- (s-high (numeric-type-high s-type))
- (low-slot (when n-low
- (if (minusp n-low)
- (ash-outer n-low s-high)
- (ash-inner n-low s-low))))
- (high-slot (when n-high
- (if (minusp n-high)
- (ash-inner n-high s-low)
- (ash-outer n-high s-high)))))
- (make-numeric-type :class 'integer
- :complexp :real
- :low low-slot
- :high high-slot))))))))
- *universal-type*))
- (or (let ((n-type (continuation-type n)))
- (when (numeric-type-p n-type)
- (let ((n-low (numeric-type-low n-type))
- (n-high (numeric-type-high n-type)))
- (if (constant-continuation-p shift)
- (let ((shift (continuation-value shift)))
- (make-numeric-type :class 'integer
- :complexp :real
- :low (when n-low (ash n-low shift))
- :high (when n-high (ash n-high shift))))
- (let ((s-type (continuation-type shift)))
- (when (numeric-type-p s-type)
- (let ((s-low (numeric-type-low s-type))
- (s-high (numeric-type-high s-type)))
- (if (and s-low s-high (<= s-low 64) (<= s-high 64))
- (make-numeric-type :class 'integer
- :complexp :real
- :low (when n-low
- (min (ash n-low s-high)
- (ash n-low s-low)))
- :high (when n-high
- (max (ash n-high s-high)
- (ash n-high s-low))))
- (make-numeric-type :class 'integer
- :complexp :real)))))))))
- *universal-type*))
-
-#!+propagate-fun-type
+
(defun ash-derive-type-aux (n-type shift same-arg)
(declare (ignore same-arg))
(flet ((ash-outer (n s)
- (when (and (target-fixnump s)
+ (when (and (fixnump s)
(<= s 64)
(> s sb!vm:*target-most-negative-fixnum*))
(ash n s)))
;; symbolic machine word size values somehow.
(ash-inner (n s)
- (if (and (target-fixnump s)
+ (if (and (fixnump s)
(> s sb!vm:*target-most-negative-fixnum*))
(ash n (min s 64))
(if (minusp n) -1 0))))
(ash-outer n-high s-high))))))
*universal-type*)))
-#!+propagate-fun-type
(defoptimizer (ash derive-type) ((n shift))
(two-arg-derive-type n shift #'ash-derive-type-aux #'ash))
) ; PROGN
-#!-propagate-float-type
+#+sb-xc-host ; (See CROSS-FLOAT-INFINITY-KLUDGE.)
(macrolet ((frob (fun)
`#'(lambda (type type2)
(declare (ignore type2))
(values (if hi (,fun hi) nil) (if lo (,fun lo) nil))))))
(defoptimizer (%negate derive-type) ((num))
- (derive-integer-type num num (frob -)))
-
- (defoptimizer (lognot derive-type) ((int))
- (derive-integer-type int int (frob lognot))))
+ (derive-integer-type num num (frob -))))
-#!+propagate-float-type
(defoptimizer (lognot derive-type) ((int))
(derive-integer-type int int
- #'(lambda (type type2)
- (declare (ignore type2))
- (let ((lo (numeric-type-low type))
- (hi (numeric-type-high type)))
- (values (if hi (lognot hi) nil)
- (if lo (lognot lo) nil)
- (numeric-type-class type)
- (numeric-type-format type))))))
-
-#!+propagate-float-type
+ (lambda (type type2)
+ (declare (ignore type2))
+ (let ((lo (numeric-type-low type))
+ (hi (numeric-type-high type)))
+ (values (if hi (lognot hi) nil)
+ (if lo (lognot lo) nil)
+ (numeric-type-class type)
+ (numeric-type-format type))))))
+
+#-sb-xc-host ; (See CROSS-FLOAT-INFINITY-KLUDGE.)
(defoptimizer (%negate derive-type) ((num))
(flet ((negate-bound (b)
- (set-bound (- (bound-value b)) (consp b))))
+ (and b
+ (set-bound (- (type-bound-number b))
+ (consp b)))))
(one-arg-derive-type num
- #'(lambda (type)
- (let ((lo (numeric-type-low type))
- (hi (numeric-type-high type))
- (result (copy-numeric-type type)))
- (setf (numeric-type-low result)
- (if hi (negate-bound hi) nil))
- (setf (numeric-type-high result)
- (if lo (negate-bound lo) nil))
- result))
+ (lambda (type)
+ (modified-numeric-type
+ type
+ :low (negate-bound (numeric-type-high type))
+ :high (negate-bound (numeric-type-low type))))
#'-)))
-#!-propagate-float-type
+#+sb-xc-host ; (See CROSS-FLOAT-INFINITY-KLUDGE.)
(defoptimizer (abs derive-type) ((num))
(let ((type (continuation-type num)))
(if (and (numeric-type-p type)
nil)))
(numeric-contagion type type))))
-#!+propagate-float-type
+#-sb-xc-host ; (See CROSS-FLOAT-INFINITY-KLUDGE.)
(defun abs-derive-type-aux (type)
(cond ((eq (numeric-type-complexp type) :complex)
;; The absolute value of a complex number is always a
:high (coerce-numeric-bound
(interval-high abs-bnd) bound-type))))))
-#!+propagate-float-type
+#-sb-xc-host ; (See CROSS-FLOAT-INFINITY-KLUDGE.)
(defoptimizer (abs derive-type) ((num))
(one-arg-derive-type num #'abs-derive-type-aux #'abs))
-#!-propagate-float-type
+#+sb-xc-host ; (See CROSS-FLOAT-INFINITY-KLUDGE.)
(defoptimizer (truncate derive-type) ((number divisor))
(let ((number-type (continuation-type number))
(divisor-type (continuation-type divisor))
divisor-low divisor-high))))
*universal-type*)))
-#-sb-xc-host ;(CROSS-FLOAT-INFINITY-KLUDGE, see base-target-features.lisp-expr)
-(progn
-#!+propagate-float-type
+#-sb-xc-host ; (See CROSS-FLOAT-INFINITY-KLUDGE.)
(progn
(defun rem-result-type (number-type divisor-type)
(let ((q-aux (symbolicate q-name "-AUX"))
(r-aux (symbolicate r-name "-AUX")))
`(progn
- ;; Compute type of quotient (first) result
+ ;; Compute type of quotient (first) result.
(defun ,q-aux (number-type divisor-type)
(let* ((number-interval
(numeric-type->interval number-type))
divisor-interval))))
(specifier-type `(integer ,(or (interval-low quot) '*)
,(or (interval-high quot) '*)))))
- ;; Compute type of remainder
+ ;; Compute type of remainder.
(defun ,r-aux (number-type divisor-type)
(let* ((divisor-interval
(numeric-type->interval divisor-type))
(values nil nil)))
(when (member result-type '(float single-float double-float
#!+long-float long-float))
- ;; Make sure the limits on the interval have
+ ;; Make sure that the limits on the interval have
;; the right type.
- (setf rem (interval-func #'(lambda (x)
- (coerce x result-type))
+ (setf rem (interval-func (lambda (x)
+ (coerce x result-type))
rem)))
(make-numeric-type :class class
:format format
:low (interval-low rem)
:high (interval-high rem)))))
- ;; The optimizer itself
+ ;; the optimizer itself
(defoptimizer (,name derive-type) ((number divisor))
(flet ((derive-q (n d same-arg)
(declare (ignore same-arg))
(rem (two-arg-derive-type
number divisor #'derive-r #'mod)))
(when (and quot rem)
- (make-values-type :required (list quot rem))))))
- ))))
+ (make-values-type :required (list quot rem))))))))))
;; FIXME: DEF-FROB-OPT, not just FROB-OPT
(frob-opt floor floor-quotient-bound floor-rem-bound)
(let ((q-aux (symbolicate "F" q-name "-AUX"))
(r-aux (symbolicate r-name "-AUX")))
`(progn
- ;; Compute type of quotient (first) result
+ ;; Compute type of quotient (first) result.
(defun ,q-aux (number-type divisor-type)
(let* ((number-interval
(numeric-type->interval number-type))
(frob-opt ffloor floor-quotient-bound floor-rem-bound)
(frob-opt fceiling ceiling-quotient-bound ceiling-rem-bound))
-;;; Functions to compute the bounds on the quotient and remainder for
-;;; the FLOOR function.
+;;; functions to compute the bounds on the quotient and remainder for
+;;; the FLOOR function
(defun floor-quotient-bound (quot)
;; Take the floor of the quotient and then massage it into what we
;; need.
;; Take the floor of the lower bound. The result is always a
;; closed lower bound.
(setf lo (if lo
- (floor (bound-value lo))
+ (floor (type-bound-number lo))
nil))
- ;; For the upper bound, we need to be careful
+ ;; For the upper bound, we need to be careful.
(setf hi
(cond ((consp hi)
;; An open bound. We need to be careful here because
;; correct sign for the remainder if we can.
(case (interval-range-info div)
(+
- ;; Divisor is always positive.
+ ;; The divisor is always positive.
(let ((rem (interval-abs div)))
(setf (interval-low rem) 0)
(when (and (numberp (interval-high rem))
(setf (interval-high rem) (list (interval-high rem))))
rem))
(-
- ;; Divisor is always negative
+ ;; The divisor is always negative.
(let ((rem (interval-neg (interval-abs div))))
(setf (interval-high rem) 0)
(when (numberp (interval-low rem))
(setf (interval-low rem) (list (interval-low rem))))
rem))
(otherwise
- ;; The divisor can be positive or negative. All bets off.
- ;; The magnitude of remainder is the maximum value of the
- ;; divisor.
- (let ((limit (bound-value (interval-high (interval-abs div)))))
- ;; The bound never reaches the limit, so make the interval open
+ ;; The divisor can be positive or negative. All bets off. The
+ ;; magnitude of remainder is the maximum value of the divisor.
+ (let ((limit (type-bound-number (interval-high (interval-abs div)))))
+ ;; The bound never reaches the limit, so make the interval open.
(make-interval :low (if limit
(list (- limit))
limit)
;; Take the ceiling of the upper bound. The result is always a
;; closed upper bound.
(setf hi (if hi
- (ceiling (bound-value hi))
+ (ceiling (type-bound-number hi))
nil))
- ;; For the lower bound, we need to be careful
+ ;; For the lower bound, we need to be careful.
(setf lo
(cond ((consp lo)
;; An open bound. We need to be careful here because
(defun ceiling-rem-bound (div)
;; The remainder depends only on the divisor. Try to get the
;; correct sign for the remainder if we can.
-
(case (interval-range-info div)
(+
;; Divisor is always positive. The remainder is negative.
(setf (interval-high rem) (list (interval-high rem))))
rem))
(otherwise
- ;; The divisor can be positive or negative. All bets off.
- ;; The magnitude of remainder is the maximum value of the
- ;; divisor.
- (let ((limit (bound-value (interval-high (interval-abs div)))))
- ;; The bound never reaches the limit, so make the interval open
+ ;; The divisor can be positive or negative. All bets off. The
+ ;; magnitude of remainder is the maximum value of the divisor.
+ (let ((limit (type-bound-number (interval-high (interval-abs div)))))
+ ;; The bound never reaches the limit, so make the interval open.
(make-interval :low (if limit
(list (- limit))
limit)
;; it's the union of the two pieces.
(case (interval-range-info quot)
(+
- ;; Just like floor
+ ;; just like FLOOR
(floor-quotient-bound quot))
(-
- ;; Just like ceiling
+ ;; just like CEILING
(ceiling-quotient-bound quot))
(otherwise
;; Split the interval into positive and negative pieces, compute
(floor-quotient-bound pos))))))
(defun truncate-rem-bound (num div)
- ;; This is significantly more complicated than floor or ceiling. We
+ ;; This is significantly more complicated than FLOOR or CEILING. We
;; need both the number and the divisor to determine the range. The
- ;; basic idea is to split the ranges of num and den into positive
+ ;; basic idea is to split the ranges of NUM and DEN into positive
;; and negative pieces and deal with each of the four possibilities
;; in turn.
(case (interval-range-info num)
(destructuring-bind (neg pos) (interval-split 0 num t t)
(interval-merge-pair (truncate-rem-bound neg div)
(truncate-rem-bound pos div))))))
-)) ; end PROGN's
+) ; PROGN
;;; Derive useful information about the range. Returns three values:
;;; - '+ if its positive, '- negative, or nil if it overlaps 0.
(defun integer-truncate-derive-type
(number-low number-high divisor-low divisor-high)
- ;; The result cannot be larger in magnitude than the number, but the sign
- ;; might change. If we can determine the sign of either the number or
- ;; the divisor, we can eliminate some of the cases.
+ ;; The result cannot be larger in magnitude than the number, but the
+ ;; sign might change. If we can determine the sign of either the
+ ;; number or the divisor, we can eliminate some of the cases.
(multiple-value-bind (number-sign number-min number-max)
(numeric-range-info number-low number-high)
(multiple-value-bind (divisor-sign divisor-min divisor-max)
;; anything about the result.
`integer)))))
-#!-propagate-float-type
+#+sb-xc-host ; (See CROSS-FLOAT-INFINITY-KLUDGE.)
(defun integer-rem-derive-type
(number-low number-high divisor-low divisor-high)
(if (and divisor-low divisor-high)
- ;; We know the range of the divisor, and the remainder must be smaller
- ;; than the divisor. We can tell the sign of the remainer if we know
- ;; the sign of the number.
+ ;; We know the range of the divisor, and the remainder must be
+ ;; smaller than the divisor. We can tell the sign of the
+ ;; remainer if we know the sign of the number.
(let ((divisor-max (1- (max (abs divisor-low) (abs divisor-high)))))
`(integer ,(if (or (null number-low)
(minusp number-low))
(plusp number-high))
divisor-max
0)))
- ;; The divisor is potentially either very positive or very negative.
- ;; Therefore, the remainer is unbounded, but we might be able to tell
- ;; something about the sign from the number.
+ ;; The divisor is potentially either very positive or very
+ ;; negative. Therefore, the remainer is unbounded, but we might
+ ;; be able to tell something about the sign from the number.
`(integer ,(if (and number-low (not (minusp number-low)))
- ;; The number we are dividing is positive. Therefore,
- ;; the remainder must be positive.
+ ;; The number we are dividing is positive.
+ ;; Therefore, the remainder must be positive.
0
'*)
,(if (and number-high (not (plusp number-high)))
- ;; The number we are dividing is negative. Therefore,
- ;; the remainder must be negative.
+ ;; The number we are dividing is negative.
+ ;; Therefore, the remainder must be negative.
0
'*))))
-#!-propagate-float-type
+#+sb-xc-host ; (See CROSS-FLOAT-INFINITY-KLUDGE.)
(defoptimizer (random derive-type) ((bound &optional state))
(let ((type (continuation-type bound)))
(when (numeric-type-p type)
((or (consp high) (zerop high)) high)
(t `(,high))))))))
-#!+propagate-float-type
+#-sb-xc-host ; (See CROSS-FLOAT-INFINITY-KLUDGE.)
(defun random-derive-type-aux (type)
(let ((class (numeric-type-class type))
(high (numeric-type-high type))
((or (consp high) (zerop high)) high)
(t `(,high))))))
-#!+propagate-float-type
+#-sb-xc-host ; (See CROSS-FLOAT-INFINITY-KLUDGE.)
(defoptimizer (random derive-type) ((bound &optional state))
(one-arg-derive-type bound #'random-derive-type-aux nil))
\f
-;;;; logical derive-type methods
+;;;; DERIVE-TYPE methods for LOGAND, LOGIOR, and friends
-;;; Return the maximum number of bits an integer of the supplied type can take
-;;; up, or NIL if it is unbounded. The second (third) value is T if the
-;;; integer can be positive (negative) and NIL if not. Zero counts as
-;;; positive.
+;;; Return the maximum number of bits an integer of the supplied type
+;;; can take up, or NIL if it is unbounded. The second (third) value
+;;; is T if the integer can be positive (negative) and NIL if not.
+;;; Zero counts as positive.
(defun integer-type-length (type)
(if (numeric-type-p type)
(let ((min (numeric-type-low type))
(or (null min) (minusp min))))
(values nil t t)))
-#!-propagate-fun-type
-(progn
-(defoptimizer (logand derive-type) ((x y))
- (multiple-value-bind (x-len x-pos x-neg)
- (integer-type-length (continuation-type x))
- (declare (ignore x-pos))
- (multiple-value-bind (y-len y-pos y-neg)
- (integer-type-length (continuation-type y))
- (declare (ignore y-pos))
- (if (not x-neg)
- ;; X must be positive.
- (if (not y-neg)
- ;; The must both be positive.
- (cond ((or (null x-len) (null y-len))
- (specifier-type 'unsigned-byte))
- ((or (zerop x-len) (zerop y-len))
- (specifier-type '(integer 0 0)))
- (t
- (specifier-type `(unsigned-byte ,(min x-len y-len)))))
- ;; X is positive, but Y might be negative.
- (cond ((null x-len)
- (specifier-type 'unsigned-byte))
- ((zerop x-len)
- (specifier-type '(integer 0 0)))
- (t
- (specifier-type `(unsigned-byte ,x-len)))))
- ;; X might be negative.
- (if (not y-neg)
- ;; Y must be positive.
- (cond ((null y-len)
- (specifier-type 'unsigned-byte))
- ((zerop y-len)
- (specifier-type '(integer 0 0)))
- (t
- (specifier-type
- `(unsigned-byte ,y-len))))
- ;; Either might be negative.
- (if (and x-len y-len)
- ;; The result is bounded.
- (specifier-type `(signed-byte ,(1+ (max x-len y-len))))
- ;; We can't tell squat about the result.
- (specifier-type 'integer)))))))
-
-(defoptimizer (logior derive-type) ((x y))
- (multiple-value-bind (x-len x-pos x-neg)
- (integer-type-length (continuation-type x))
- (multiple-value-bind (y-len y-pos y-neg)
- (integer-type-length (continuation-type y))
- (cond
- ((and (not x-neg) (not y-neg))
- ;; Both are positive.
- (specifier-type `(unsigned-byte ,(if (and x-len y-len)
- (max x-len y-len)
- '*))))
- ((not x-pos)
- ;; X must be negative.
- (if (not y-pos)
- ;; Both are negative. The result is going to be negative and be
- ;; the same length or shorter than the smaller.
- (if (and x-len y-len)
- ;; It's bounded.
- (specifier-type `(integer ,(ash -1 (min x-len y-len)) -1))
- ;; It's unbounded.
- (specifier-type '(integer * -1)))
- ;; X is negative, but we don't know about Y. The result will be
- ;; negative, but no more negative than X.
- (specifier-type
- `(integer ,(or (numeric-type-low (continuation-type x)) '*)
- -1))))
- (t
- ;; X might be either positive or negative.
- (if (not y-pos)
- ;; But Y is negative. The result will be negative.
- (specifier-type
- `(integer ,(or (numeric-type-low (continuation-type y)) '*)
- -1))
- ;; We don't know squat about either. It won't get any bigger.
- (if (and x-len y-len)
- ;; Bounded.
- (specifier-type `(signed-byte ,(1+ (max x-len y-len))))
- ;; Unbounded.
- (specifier-type 'integer))))))))
-
-(defoptimizer (logxor derive-type) ((x y))
- (multiple-value-bind (x-len x-pos x-neg)
- (integer-type-length (continuation-type x))
- (multiple-value-bind (y-len y-pos y-neg)
- (integer-type-length (continuation-type y))
- (cond
- ((or (and (not x-neg) (not y-neg))
- (and (not x-pos) (not y-pos)))
- ;; Either both are negative or both are positive. The result will be
- ;; positive, and as long as the longer.
- (specifier-type `(unsigned-byte ,(if (and x-len y-len)
- (max x-len y-len)
- '*))))
- ((or (and (not x-pos) (not y-neg))
- (and (not y-neg) (not y-pos)))
- ;; Either X is negative and Y is positive of vice-verca. The result
- ;; will be negative.
- (specifier-type `(integer ,(if (and x-len y-len)
- (ash -1 (max x-len y-len))
- '*)
- -1)))
- ;; We can't tell what the sign of the result is going to be. All we
- ;; know is that we don't create new bits.
- ((and x-len y-len)
- (specifier-type `(signed-byte ,(1+ (max x-len y-len)))))
- (t
- (specifier-type 'integer))))))
-
-) ; PROGN
-
-#!+propagate-fun-type
-(progn
(defun logand-derive-type-aux (x y &optional same-leaf)
(declare (ignore same-leaf))
(multiple-value-bind (x-len x-pos x-neg) (integer-type-length x)
(if (not x-neg)
;; X must be positive.
(if (not y-neg)
- ;; The must both be positive.
+ ;; They must both be positive.
(cond ((or (null x-len) (null y-len))
(specifier-type 'unsigned-byte))
((or (zerop x-len) (zerop y-len))
((not x-pos)
;; X must be negative.
(if (not y-pos)
- ;; Both are negative. The result is going to be negative and be
- ;; the same length or shorter than the smaller.
+ ;; Both are negative. The result is going to be negative
+ ;; and be the same length or shorter than the smaller.
(if (and x-len y-len)
;; It's bounded.
(specifier-type `(integer ,(ash -1 (min x-len y-len)) -1))
;; It's unbounded.
(specifier-type '(integer * -1)))
- ;; X is negative, but we don't know about Y. The result will be
- ;; negative, but no more negative than X.
+ ;; X is negative, but we don't know about Y. The result
+ ;; will be negative, but no more negative than X.
(specifier-type
`(integer ,(or (numeric-type-low x) '*)
-1))))
(cond
((or (and (not x-neg) (not y-neg))
(and (not x-pos) (not y-pos)))
- ;; Either both are negative or both are positive. The result will be
- ;; positive, and as long as the longer.
+ ;; Either both are negative or both are positive. The result
+ ;; will be positive, and as long as the longer.
(if (and x-len y-len (zerop x-len) (zerop y-len))
(specifier-type '(integer 0 0))
(specifier-type `(unsigned-byte ,(if (and x-len y-len)
'*)))))
((or (and (not x-pos) (not y-neg))
(and (not y-neg) (not y-pos)))
- ;; Either X is negative and Y is positive of vice-verca. The result
- ;; will be negative.
+ ;; Either X is negative and Y is positive of vice-versa. The
+ ;; result will be negative.
(specifier-type `(integer ,(if (and x-len y-len)
(ash -1 (max x-len y-len))
'*)
-1)))
- ;; We can't tell what the sign of the result is going to be. All we
- ;; know is that we don't create new bits.
+ ;; We can't tell what the sign of the result is going to be.
+ ;; All we know is that we don't create new bits.
((and x-len y-len)
(specifier-type `(signed-byte ,(1+ (max x-len y-len)))))
(t
(specifier-type 'integer))))))
-(macrolet ((frob (logfcn)
+(macrolet ((deffrob (logfcn)
(let ((fcn-aux (symbolicate logfcn "-DERIVE-TYPE-AUX")))
`(defoptimizer (,logfcn derive-type) ((x y))
(two-arg-derive-type x y #',fcn-aux #',logfcn)))))
- ;; FIXME: DEF-FROB, not just FROB
- (frob logand)
- (frob logior)
- (frob logxor))
+ (deffrob logand)
+ (deffrob logior)
+ (deffrob logxor))
+\f
+;;;; miscellaneous derive-type methods
(defoptimizer (integer-length derive-type) ((x))
(let ((x-type (continuation-type x)))
(when (and (numeric-type-p x-type)
(csubtypep x-type (specifier-type 'integer)))
- ;; If the X is of type (INTEGER LO HI), then the integer-length
- ;; of X is (INTEGER (min lo hi) (max lo hi), basically. Be
+ ;; If the X is of type (INTEGER LO HI), then the INTEGER-LENGTH
+ ;; of X is (INTEGER (MIN lo hi) (MAX lo hi), basically. Be
;; careful about LO or HI being NIL, though. Also, if 0 is
;; contained in X, the lower bound is obviously 0.
(flet ((null-or-min (a b)
(when (ctypep 0 x-type)
(setf min-len 0))
(specifier-type `(integer ,(or min-len '*) ,(or max-len '*))))))))
-) ; PROGN
-\f
-;;;; miscellaneous derive-type methods
(defoptimizer (code-char derive-type) ((code))
(specifier-type 'base-char))
\f
;;;; byte operations
;;;;
-;;;; We try to turn byte operations into simple logical operations. First, we
-;;;; convert byte specifiers into separate size and position arguments passed
-;;;; to internal %FOO functions. We then attempt to transform the %FOO
-;;;; functions into boolean operations when the size and position are constant
-;;;; and the operands are fixnums.
-
-(macrolet (;; Evaluate body with SIZE-VAR and POS-VAR bound to expressions that
- ;; evaluate to the SIZE and POSITION of the byte-specifier form
- ;; SPEC. We may wrap a let around the result of the body to bind
- ;; some variables.
+;;;; We try to turn byte operations into simple logical operations.
+;;;; First, we convert byte specifiers into separate size and position
+;;;; arguments passed to internal %FOO functions. We then attempt to
+;;;; transform the %FOO functions into boolean operations when the
+;;;; size and position are constant and the operands are fixnums.
+
+(macrolet (;; Evaluate body with SIZE-VAR and POS-VAR bound to
+ ;; expressions that evaluate to the SIZE and POSITION of
+ ;; the byte-specifier form SPEC. We may wrap a let around
+ ;; the result of the body to bind some variables.
;;
- ;; If the spec is a BYTE form, then bind the vars to the subforms.
- ;; otherwise, evaluate SPEC and use the BYTE-SIZE and BYTE-POSITION.
- ;; The goal of this transformation is to avoid consing up byte
- ;; specifiers and then immediately throwing them away.
+ ;; If the spec is a BYTE form, then bind the vars to the
+ ;; subforms. otherwise, evaluate SPEC and use the BYTE-SIZE
+ ;; and BYTE-POSITION. The goal of this transformation is to
+ ;; avoid consing up byte specifiers and then immediately
+ ;; throwing them away.
(with-byte-specifier ((size-var pos-var spec) &body body)
(once-only ((spec `(macroexpand ,spec))
(temp '(gensym)))
;;; Note: for %DPB and %DEPOSIT-FIELD, we can't use
;;; (OR (SIGNED-BYTE N) (UNSIGNED-BYTE N))
-;;; as the result type, as that would allow result types
-;;; that cover the range -2^(n-1) .. 1-2^n, instead of allowing result types
-;;; of (UNSIGNED-BYTE N) and result types of (SIGNED-BYTE N).
+;;; as the result type, as that would allow result types that cover
+;;; the range -2^(n-1) .. 1-2^n, instead of allowing result types of
+;;; (UNSIGNED-BYTE N) and result types of (SIGNED-BYTE N).
(deftransform %dpb ((new size posn int)
*
(dolist (x '(= char= + * logior logand logxor))
(%deftransform x '(function * *) #'commutative-arg-swap
- "place constant arg last."))
+ "place constant arg last"))
;;; Handle the case of a constant BOOLE-CODE.
(deftransform boole ((op x y) * * :when :both)
`(- (ash x ,len))
`(ash x ,len))))
-;;; If both arguments and the result are (unsigned-byte 32), try to come up
-;;; with a ``better'' multiplication using multiplier recoding. There are two
-;;; different ways the multiplier can be recoded. The more obvious is to shift
-;;; X by the correct amount for each bit set in Y and to sum the results. But
-;;; if there is a string of bits that are all set, you can add X shifted by
-;;; one more then the bit position of the first set bit and subtract X shifted
-;;; by the bit position of the last set bit. We can't use this second method
-;;; when the high order bit is bit 31 because shifting by 32 doesn't work
-;;; too well.
+;;; If both arguments and the result are (UNSIGNED-BYTE 32), try to
+;;; come up with a ``better'' multiplication using multiplier
+;;; recoding. There are two different ways the multiplier can be
+;;; recoded. The more obvious is to shift X by the correct amount for
+;;; each bit set in Y and to sum the results. But if there is a string
+;;; of bits that are all set, you can add X shifted by one more then
+;;; the bit position of the first set bit and subtract X shifted by
+;;; the bit position of the last set bit. We can't use this second
+;;; method when the high order bit is bit 31 because shifting by 32
+;;; doesn't work too well.
(deftransform * ((x y)
((unsigned-byte 32) (unsigned-byte 32))
(unsigned-byte 32))
(add '(ash x 31))))
(or result 0)))
-;;; If arg is a constant power of two, turn FLOOR into a shift and mask.
-;;; If CEILING, add in (1- (ABS Y)) and then do FLOOR.
+;;; If arg is a constant power of two, turn FLOOR into a shift and
+;;; mask. If CEILING, add in (1- (ABS Y)) and then do FLOOR.
(flet ((frob (y ceil-p)
(unless (constant-continuation-p y)
(give-up-ir1-transform))
(logand x ,mask)))))
\f
;;;; arithmetic and logical identity operation elimination
-;;;;
-;;;; Flush calls to various arith functions that convert to the identity
-;;;; function or a constant.
+;;; Flush calls to various arith functions that convert to the
+;;; identity function or a constant.
+;;;
+;;; FIXME: Rewrite as DEF-FROB.
(dolist (stuff '((ash 0 x)
(logand -1 x)
(logand 0 0)
'(%negate y))
(deftransform * ((x y) (rational (constant-argument (member 0))) *
:when :both)
- "convert (* x 0) to 0."
+ "convert (* x 0) to 0"
0)
-;;; Return T if in an arithmetic op including continuations X and Y, the
-;;; result type is not affected by the type of X. That is, Y is at least as
-;;; contagious as X.
+;;; Return T if in an arithmetic op including continuations X and Y,
+;;; the result type is not affected by the type of X. That is, Y is at
+;;; least as contagious as X.
#+nil
(defun not-more-contagious (x y)
(declare (type continuation x y))
(values (type= (numeric-contagion x y)
(numeric-contagion y y)))))
;;; Patched version by Raymond Toy. dtc: Should be safer although it
-;;; needs more work as valid transforms are missed; some cases are
+;;; XXX needs more work as valid transforms are missed; some cases are
;;; specific to particular transform functions so the use of this
;;; function may need a re-think.
(defun not-more-contagious (x y)
;;; Fold (+ x 0).
;;;
-;;; If y is not constant, not zerop, or is contagious, or a
-;;; positive float +0.0 then give up.
+;;; If y is not constant, not zerop, or is contagious, or a positive
+;;; float +0.0 then give up.
(deftransform + ((x y) (t (constant-argument t)) * :when :both)
"fold zero arg"
(let ((val (continuation-value y)))
;;; Fold (- x 0).
;;;
-;;; If y is not constant, not zerop, or is contagious, or a
-;;; negative float -0.0 then give up.
+;;; If y is not constant, not zerop, or is contagious, or a negative
+;;; float -0.0 then give up.
(deftransform - ((x y) (t (constant-argument t)) * :when :both)
"fold zero arg"
(let ((val (continuation-value y)))
\f
;;;; equality predicate transforms
-;;; Return true if X and Y are continuations whose only use is a reference
-;;; to the same leaf, and the value of the leaf cannot change.
+;;; Return true if X and Y are continuations whose only use is a
+;;; reference to the same leaf, and the value of the leaf cannot
+;;; change.
(defun same-leaf-ref-p (x y)
(declare (type continuation x y))
(let ((x-use (continuation-use x))
(eq (ref-leaf x-use) (ref-leaf y-use))
(constant-reference-p x-use))))
-;;; If X and Y are the same leaf, then the result is true. Otherwise, if
-;;; there is no intersection between the types of the arguments, then the
-;;; result is definitely false.
+;;; If X and Y are the same leaf, then the result is true. Otherwise,
+;;; if there is no intersection between the types of the arguments,
+;;; then the result is definitely false.
(deftransform simple-equality-transform ((x y) * *
:defun-only t
:when :both)
(cond ((same-leaf-ref-p x y)
- 't)
- ((not (types-intersect (continuation-type x) (continuation-type y)))
- 'nil)
+ t)
+ ((not (types-equal-or-intersect (continuation-type x)
+ (continuation-type y)))
+ nil)
(t
(give-up-ir1-transform))))
(dolist (x '(eq char= equal))
(%deftransform x '(function * *) #'simple-equality-transform))
-;;; Similar to SIMPLE-EQUALITY-PREDICATE, except that we also try to
-;;; convert to a type-specific predicate or EQ:
+;;; This is similar to SIMPLE-EQUALITY-PREDICATE, except that we also
+;;; try to convert to a type-specific predicate or EQ:
;;; -- If both args are characters, convert to CHAR=. This is better than
;;; just converting to EQ, since CHAR= may have special compilation
;;; strategies for non-standard representations, etc.
;;; it second. These rules make it easier for the back end to match
;;; these interesting cases.
;;; -- If Y is a fixnum, then we quietly pass because the back end can
-;;; handle that case, otherwise give an efficency note.
+;;; handle that case, otherwise give an efficiency note.
(deftransform eql ((x y) * * :when :both)
"convert to simpler equality predicate"
(let ((x-type (continuation-type x))
(char-type (specifier-type 'character))
(number-type (specifier-type 'number)))
(cond ((same-leaf-ref-p x y)
- 't)
- ((not (types-intersect x-type y-type))
- 'nil)
+ t)
+ ((not (types-equal-or-intersect x-type y-type))
+ nil)
((and (csubtypep x-type char-type)
(csubtypep y-type char-type))
'(char= x y))
- ((or (not (types-intersect x-type number-type))
- (not (types-intersect y-type number-type)))
+ ((or (not (types-equal-or-intersect x-type number-type))
+ (not (types-equal-or-intersect y-type number-type)))
'(eq x y))
((and (not (constant-continuation-p y))
(or (constant-continuation-p x)
(give-up-ir1-transform))
((or (and (csubtypep x-type (specifier-type 'rational))
(csubtypep y-type (specifier-type 'rational)))
- (and (csubtypep x-type (specifier-type '(complex rational)))
- (csubtypep y-type (specifier-type '(complex rational)))))
- ;; They are both rationals and complexp is the same. Convert
- ;; to EQL.
+ (and (csubtypep x-type
+ (specifier-type '(complex rational)))
+ (csubtypep y-type
+ (specifier-type '(complex rational)))))
+ ;; They are both rationals and complexp is the same.
+ ;; Convert to EQL.
'(eql x y))
(t
(give-up-ir1-transform
(give-up-ir1-transform
"The operands might not be the same type."))))
-;;; If Cont's type is a numeric type, then return the type, otherwise
+;;; If CONT's type is a numeric type, then return the type, otherwise
;;; GIVE-UP-IR1-TRANSFORM.
(defun numeric-type-or-lose (cont)
(declare (type continuation cont))
(unless (numeric-type-p res) (give-up-ir1-transform))
res))
-;;; See whether we can statically determine (< X Y) using type information.
-;;; If X's high bound is < Y's low, then X < Y. Similarly, if X's low is >=
-;;; to Y's high, the X >= Y (so return NIL). If not, at least make sure any
-;;; constant arg is second.
+;;; See whether we can statically determine (< X Y) using type
+;;; information. If X's high bound is < Y's low, then X < Y.
+;;; Similarly, if X's low is >= to Y's high, the X >= Y (so return
+;;; NIL). If not, at least make sure any constant arg is second.
;;;
-;;; KLUDGE: Why should constant argument be second? It would be nice to find
-;;; out and explain. -- WHN 19990917
-#!-propagate-float-type
+;;; FIXME: Why should constant argument be second? It would be nice to
+;;; find out and explain.
+#+sb-xc-host ; (See CROSS-FLOAT-INFINITY-KLUDGE.)
(defun ir1-transform-< (x y first second inverse)
(if (same-leaf-ref-p x y)
- 'nil
+ nil
(let* ((x-type (numeric-type-or-lose x))
(x-lo (numeric-type-low x-type))
(x-hi (numeric-type-high x-type))
(y-lo (numeric-type-low y-type))
(y-hi (numeric-type-high y-type)))
(cond ((and x-hi y-lo (< x-hi y-lo))
- 't)
+ t)
((and y-hi x-lo (>= x-lo y-hi))
- 'nil)
+ nil)
((and (constant-continuation-p first)
(not (constant-continuation-p second)))
`(,inverse y x))
(t
(give-up-ir1-transform))))))
-#!+propagate-float-type
+#-sb-xc-host ; (See CROSS-FLOAT-INFINITY-KLUDGE.)
(defun ir1-transform-< (x y first second inverse)
(if (same-leaf-ref-p x y)
- 'nil
+ nil
(let ((xi (numeric-type->interval (numeric-type-or-lose x)))
(yi (numeric-type->interval (numeric-type-or-lose y))))
(cond ((interval-< xi yi)
- 't)
+ t)
((interval->= xi yi)
- 'nil)
+ nil)
((and (constant-continuation-p first)
(not (constant-continuation-p second)))
`(,inverse y x))
(deftransform > ((x y) (integer integer) * :when :both)
(ir1-transform-< y x x y '<))
-#!+propagate-float-type
+#-sb-xc-host ; (See CROSS-FLOAT-INFINITY-KLUDGE.)
(deftransform < ((x y) (float float) * :when :both)
(ir1-transform-< x y x y '>))
-#!+propagate-float-type
+#-sb-xc-host ; (See CROSS-FLOAT-INFINITY-KLUDGE.)
(deftransform > ((x y) (float float) * :when :both)
(ir1-transform-< y x x y '<))
\f
(last nil current)
(current (gensym) (gensym))
(vars (list current) (cons current vars))
- (result 't (if not-p
- `(if (,predicate ,current ,last)
- nil ,result)
- `(if (,predicate ,current ,last)
- ,result nil))))
+ (result t (if not-p
+ `(if (,predicate ,current ,last)
+ nil ,result)
+ `(if (,predicate ,current ,last)
+ ,result nil))))
((zerop i)
`((lambda ,vars ,result) . ,args)))))))
(def-source-transform char<= (&rest args) (multi-compare 'char> args t))
(def-source-transform char>= (&rest args) (multi-compare 'char< args t))
-(def-source-transform char-equal (&rest args) (multi-compare 'char-equal args nil))
-(def-source-transform char-lessp (&rest args) (multi-compare 'char-lessp args nil))
+(def-source-transform char-equal (&rest args)
+ (multi-compare 'char-equal args nil))
+(def-source-transform char-lessp (&rest args)
+ (multi-compare 'char-lessp args nil))
(def-source-transform char-greaterp (&rest args)
(multi-compare 'char-greaterp args nil))
(def-source-transform char-not-greaterp (&rest args)
(multi-compare 'char-greaterp args t))
-(def-source-transform char-not-lessp (&rest args) (multi-compare 'char-lessp args t))
+(def-source-transform char-not-lessp (&rest args)
+ (multi-compare 'char-lessp args t))
;;; This function does source transformation of N-arg inequality
;;; functions such as /=. This is similar to Multi-Compare in the <3
((= nargs 1) `(progn ,@args t))
((= nargs 2)
`(if (,predicate ,(first args) ,(second args)) nil t))
- ((not (policy nil (and (>= speed space)
- (>= speed compilation-speed))))
+ ((not (policy *lexenv*
+ (and (>= speed space)
+ (>= speed compilation-speed))))
(values nil t))
(t
(let ((vars (make-gensym-list nargs)))
(do ((var vars next)
(next (cdr vars) (cdr next))
- (result 't))
+ (result t))
((null next)
`((lambda ,vars ,result) . ,args))
(let ((v1 (first var)))
(def-source-transform /= (&rest args) (multi-not-equal '= args))
(def-source-transform char/= (&rest args) (multi-not-equal 'char= args))
-(def-source-transform char-not-equal (&rest args) (multi-not-equal 'char-equal args))
+(def-source-transform char-not-equal (&rest args)
+ (multi-not-equal 'char-equal args))
;;; Expand MAX and MIN into the obvious comparisons.
(def-source-transform max (arg &rest more-args)
;;;; N-arg arithmetic and logic functions are associated into two-arg
;;;; versions, and degenerate cases are flushed.
-;;; Left-associate First-Arg and More-Args using Function.
+;;; Left-associate FIRST-ARG and MORE-ARGS using FUNCTION.
(declaim (ftype (function (symbol t list) list) associate-arguments))
(defun associate-arguments (function first-arg more-args)
(let ((next (rest more-args))
(def-source-transform / (&rest args)
(source-transform-intransitive '/ args '(/ 1)))
\f
-;;;; APPLY
+;;;; transforming APPLY
;;; We convert APPLY into MULTIPLE-VALUE-CALL so that the compiler
;;; only needs to understand one kind of variable-argument call. It is
(butlast args))
(values-list ,(car (last args))))))
\f
-;;;; FORMAT
+;;;; transforming FORMAT
;;;;
;;;; If the control string is a compile-time constant, then replace it
;;;; with a use of the FORMATTER macro so that the control string is
(declare (ignore tee))
(funcall control *standard-output* ,@arg-names)
nil)))
+
+(defoptimizer (coerce derive-type) ((value type))
+ (let ((value-type (continuation-type value))
+ (type-type (continuation-type type)))
+ (labels
+ ((good-cons-type-p (cons-type)
+ ;; Make sure the cons-type we're looking at is something
+ ;; we're prepared to handle which is basically something
+ ;; that array-element-type can return.
+ (or (and (member-type-p cons-type)
+ (null (rest (member-type-members cons-type)))
+ (null (first (member-type-members cons-type))))
+ (let ((car-type (cons-type-car-type cons-type)))
+ (and (member-type-p car-type)
+ (null (rest (member-type-members car-type)))
+ (or (symbolp (first (member-type-members car-type)))
+ (numberp (first (member-type-members car-type)))
+ (and (listp (first (member-type-members car-type)))
+ (numberp (first (first (member-type-members
+ car-type))))))
+ (good-cons-type-p (cons-type-cdr-type cons-type))))))
+ (unconsify-type (good-cons-type)
+ ;; Convert the "printed" respresentation of a cons
+ ;; specifier into a type specifier. That is, the specifier
+ ;; (cons (eql signed-byte) (cons (eql 16) null)) is
+ ;; converted to (signed-byte 16).
+ (cond ((or (null good-cons-type)
+ (eq good-cons-type 'null))
+ nil)
+ ((and (eq (first good-cons-type) 'cons)
+ (eq (first (second good-cons-type)) 'member))
+ `(,(second (second good-cons-type))
+ ,@(unconsify-type (caddr good-cons-type))))))
+ (coerceable-p (c-type)
+ ;; Can the value be coerced to the given type? Coerce is
+ ;; complicated, so we don't handle every possible case
+ ;; here---just the most common and easiest cases:
+ ;;
+ ;; o Any real can be coerced to a float type.
+ ;; o Any number can be coerced to a complex single/double-float.
+ ;; o An integer can be coerced to an integer.
+ (let ((coerced-type c-type))
+ (or (and (subtypep coerced-type 'float)
+ (csubtypep value-type (specifier-type 'real)))
+ (and (subtypep coerced-type
+ '(or (complex single-float)
+ (complex double-float)))
+ (csubtypep value-type (specifier-type 'number)))
+ (and (subtypep coerced-type 'integer)
+ (csubtypep value-type (specifier-type 'integer))))))
+ (process-types (type)
+ ;; FIXME:
+ ;; This needs some work because we should be able to derive
+ ;; the resulting type better than just the type arg of
+ ;; coerce. That is, if x is (integer 10 20), the (coerce x
+ ;; 'double-float) should say (double-float 10d0 20d0)
+ ;; instead of just double-float.
+ (cond ((member-type-p type)
+ (let ((members (member-type-members type)))
+ (if (every #'coerceable-p members)
+ (specifier-type `(or ,@members))
+ *universal-type*)))
+ ((and (cons-type-p type)
+ (good-cons-type-p type))
+ (let ((c-type (unconsify-type (type-specifier type))))
+ (if (coerceable-p c-type)
+ (specifier-type c-type)
+ *universal-type*)))
+ (t
+ *universal-type*))))
+ (cond ((union-type-p type-type)
+ (apply #'type-union (mapcar #'process-types
+ (union-type-types type-type))))
+ ((or (member-type-p type-type)
+ (cons-type-p type-type))
+ (process-types type-type))
+ (t
+ *universal-type*)))))
+
+(defoptimizer (array-element-type derive-type) ((array))
+ (let* ((array-type (continuation-type array)))
+ (labels ((consify (list)
+ (if (endp list)
+ '(eql nil)
+ `(cons (eql ,(car list)) ,(consify (rest list)))))
+ (get-element-type (a)
+ (let ((element-type
+ (type-specifier (array-type-specialized-element-type a))))
+ (cond ((eq element-type '*)
+ (specifier-type 'type-specifier))
+ ((symbolp element-type)
+ (make-member-type :members (list element-type)))
+ ((consp element-type)
+ (specifier-type (consify element-type)))
+ (t
+ (error "can't understand type ~S~%" element-type))))))
+ (cond ((array-type-p array-type)
+ (get-element-type array-type))
+ ((union-type-p array-type)
+ (apply #'type-union
+ (mapcar #'get-element-type (union-type-types array-type))))
+ (t
+ *universal-type*)))))
+\f
+;;;; debuggers' little helpers
+
+;;; for debugging when transforms are behaving mysteriously,
+;;; e.g. when debugging a problem with an ASH transform
+;;; (defun foo (&optional s)
+;;; (sb-c::/report-continuation s "S outside WHEN")
+;;; (when (and (integerp s) (> s 3))
+;;; (sb-c::/report-continuation s "S inside WHEN")
+;;; (let ((bound (ash 1 (1- s))))
+;;; (sb-c::/report-continuation bound "BOUND")
+;;; (let ((x (- bound))
+;;; (y (1- bound)))
+;;; (sb-c::/report-continuation x "X")
+;;; (sb-c::/report-continuation x "Y"))
+;;; `(integer ,(- bound) ,(1- bound)))))
+;;; (The DEFTRANSFORM doesn't do anything but report at compile time,
+;;; and the function doesn't do anything at all.)
+#!+sb-show
+(progn
+ (defknown /report-continuation (t t) null)
+ (deftransform /report-continuation ((x message) (t t))
+ (format t "~%/in /REPORT-CONTINUATION~%")
+ (format t "/(CONTINUATION-TYPE X)=~S~%" (continuation-type x))
+ (when (constant-continuation-p x)
+ (format t "/(CONTINUATION-VALUE X)=~S~%" (continuation-value x)))
+ (format t "/MESSAGE=~S~%" (continuation-value message))
+ (give-up-ir1-transform "not a real transform"))
+ (defun /report-continuation (&rest rest)
+ (declare (ignore rest))))