#-sb-xc-host ; (See CROSS-FLOAT-INFINITY-KLUDGE.)
(deffrob ceiling))
-(define-source-transform lognand (x y) `(lognot (logand ,x ,y)))
-(define-source-transform lognor (x y) `(lognot (logior ,x ,y)))
-(define-source-transform logandc1 (x y) `(logand (lognot ,x) ,y))
-(define-source-transform logandc2 (x y) `(logand ,x (lognot ,y)))
-(define-source-transform logorc1 (x y) `(logior (lognot ,x) ,y))
-(define-source-transform logorc2 (x y) `(logior ,x (lognot ,y)))
(define-source-transform logtest (x y) `(not (zerop (logand ,x ,y))))
(deftransform logbitp
(defun make-interval (&key low high)
(labels ((normalize-bound (val)
- (cond ((and (floatp val)
+ (cond #-sb-xc-host
+ ((and (floatp val)
(float-infinity-p val))
;; Handle infinities.
nil)
(make-interval :low (numeric-type-low x)
:high (numeric-type-high x)))
+(defun type-approximate-interval (type)
+ (declare (type ctype type))
+ (let ((types (prepare-arg-for-derive-type type))
+ (result nil))
+ (dolist (type types)
+ (let ((type (if (member-type-p type)
+ (convert-member-type type)
+ type)))
+ (unless (numeric-type-p type)
+ (return-from type-approximate-interval nil))
+ (let ((interval (numeric-type->interval type)))
+ (setq result
+ (if result
+ (interval-approximate-union result interval)
+ interval)))))
+ result))
+
(defun copy-interval-limit (limit)
(if (numberp limit)
limit
(make-interval :low (select-bound x-lo y-lo #'< #'>)
:high (select-bound x-hi y-hi #'> #'<))))))
+;;; return the minimal interval, containing X and Y
+(defun interval-approximate-union (x y)
+ (cond ((interval-merge-pair x y))
+ ((interval-< x y)
+ (make-interval :low (copy-interval-limit (interval-low x))
+ :high (copy-interval-limit (interval-high y))))
+ (t
+ (make-interval :low (copy-interval-limit (interval-low y))
+ :high (copy-interval-limit (interval-high x))))))
+
;;; 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.
;;; 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.
+;;; Otherwise, we use NUMERIC-CONTAGION.
+(defun derive-integer-type-aux (x y fun)
+ (declare (type function fun))
+ (if (and (numeric-type-p x) (numeric-type-p y)
+ (eq (numeric-type-class x) 'integer)
+ (eq (numeric-type-class y) 'integer)
+ (eq (numeric-type-complexp x) :real)
+ (eq (numeric-type-complexp y) :real))
+ (multiple-value-bind (low high) (funcall fun x y)
+ (make-numeric-type :class 'integer
+ :complexp :real
+ :low low
+ :high high))
+ (numeric-contagion x y)))
+
(defun derive-integer-type (x y fun)
(declare (type lvar x y) (type function fun))
(let ((x (lvar-type x))
(y (lvar-type y)))
- (if (and (numeric-type-p x) (numeric-type-p y)
- (eq (numeric-type-class x) 'integer)
- (eq (numeric-type-class y) 'integer)
- (eq (numeric-type-complexp x) :real)
- (eq (numeric-type-complexp y) :real))
- (multiple-value-bind (low high) (funcall fun x y)
- (make-numeric-type :class 'integer
- :complexp :real
- :low low
- :high high))
- (numeric-contagion x y))))
+ (derive-integer-type-aux x y fun)))
;;; 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)
- ((atom x)
- (cons x r))
- (t (flatten-helper (car x)
- (flatten-helper (cdr x) r))))))
- (flatten-helper x nil)))
-
-;;; Take some type of continuation and massage it so that we get a
-;;; list of the constituent types. If ARG is *EMPTY-TYPE*, return NIL
-;;; to indicate failure.
+ (labels ((flatten-and-append (tree list)
+ (cond ((null tree) list)
+ ((atom tree) (cons tree list))
+ (t (flatten-and-append
+ (car tree) (flatten-and-append (cdr tree) list))))))
+ (flatten-and-append x nil)))
+
+;;; Take some type of lvar and massage it so that we get a list of the
+;;; constituent types. If ARG is *EMPTY-TYPE*, return NIL to indicate
+;;; failure.
(defun prepare-arg-for-derive-type (arg)
(flet ((listify (arg)
(typecase arg
;;; This is used in defoptimizers for computing the resulting type of
;;; a function.
;;;
-;;; Given the continuation ARG, derive the resulting type using the
+;;; Given the lvar ARG, derive the resulting type using the
;;; DERIVE-FUN. DERIVE-FUN takes exactly one argument which is some
-;;; "atomic" continuation type like numeric-type or member-type
-;;; (containing just one element). It should return the resulting
-;;; type, which can be a list of types.
+;;; "atomic" lvar type like numeric-type or member-type (containing
+;;; just one element). It should return the resulting type, which can
+;;; be a list of types.
;;;
;;; For the case of member types, if a MEMBER-FUN is given it is
;;; called to compute the result otherwise the member type is first
(if member-fun
(with-float-traps-masked
(:underflow :overflow :divide-by-zero)
- (make-member-type
- :members (list
- (funcall member-fun
- (first (member-type-members x))))))
+ (specifier-type
+ `(eql ,(funcall member-fun
+ (first (member-type-members x))))))
;; Otherwise convert to a numeric type.
(let ((result-type-list
(funcall derive-fun (convert-member-type x))))
;;; Same as ONE-ARG-DERIVE-TYPE, except we assume the function takes
;;; two arguments. DERIVE-FUN takes 3 args in this case: the two
;;; original args and a third which is T to indicate if the two args
-;;; really represent the same continuation. This is useful for
-;;; deriving the type of things like (* x x), which should always be
-;;; positive. If we didn't do this, we wouldn't be able to tell.
+;;; really represent the same lvar. This is useful for deriving the
+;;; type of things like (* x x), which should always be positive. If
+;;; we didn't do this, we wouldn't be able to tell.
(defun two-arg-derive-type (arg1 arg2 derive-fun fun
&optional (convert-type t))
(declare (type function derive-fun fun))
(cond ((and (member-type-p x) (member-type-p y))
(let* ((x (first (member-type-members x)))
(y (first (member-type-members y)))
- (result (with-float-traps-masked
- (:underflow :overflow :divide-by-zero
- :invalid)
- (funcall fun x y))))
- (cond ((null result))
+ (result (ignore-errors
+ (with-float-traps-masked
+ (:underflow :overflow :divide-by-zero
+ :invalid)
+ (funcall fun x y)))))
+ (cond ((null result) *empty-type*)
((and (floatp result) (float-nan-p result))
(make-numeric-type :class 'float
:format (type-of result)
:complexp :real))
(t
- (make-member-type :members (list result))))))
+ (specifier-type `(eql ,result))))))
((and (member-type-p x) (numeric-type-p y))
(let* ((x (convert-member-type x))
(y (if convert-type (convert-numeric-type y) y))
(when (and a1 a2)
(let ((results nil))
(if same-arg
- ;; Since the args are the same continuation, just run
- ;; down the lists.
+ ;; Since the args are the same LVARs, just run down the
+ ;; lists.
(dolist (x a1)
(let ((result (deriver x x same-arg)))
(if (listp result)
(defoptimizer (%negate derive-type) ((num))
(derive-integer-type num num (frob -))))
+(defun lognot-derive-type-aux (int)
+ (derive-integer-type-aux 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))))))
+
(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))))))
+ (lognot-derive-type-aux (lvar-type int)))
#-sb-xc-host ; (See CROSS-FLOAT-INFINITY-KLUDGE.)
(defoptimizer (%negate derive-type) ((num))
'*))))
((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-versa. The
+ ;; Either X is negative and Y is positive or vice-versa. The
;; result will be negative.
(specifier-type `(integer ,(if (and x-len y-len)
(ash -1 (max x-len y-len))
(deffrob logand)
(deffrob logior)
(deffrob logxor))
+
+;;; FIXME: could actually do stuff with SAME-LEAF
+(defoptimizer (logeqv derive-type) ((x y))
+ (two-arg-derive-type x y (lambda (x y same-leaf)
+ (lognot-derive-type-aux
+ (logxor-derive-type-aux x y same-leaf)))
+ #'logeqv))
+(defoptimizer (lognand derive-type) ((x y))
+ (two-arg-derive-type x y (lambda (x y same-leaf)
+ (lognot-derive-type-aux
+ (logand-derive-type-aux x y same-leaf)))
+ #'lognand))
+(defoptimizer (lognor derive-type) ((x y))
+ (two-arg-derive-type x y (lambda (x y same-leaf)
+ (lognot-derive-type-aux
+ (logior-derive-type-aux x y same-leaf)))
+ #'lognor))
+(defoptimizer (logandc1 derive-type) ((x y))
+ (two-arg-derive-type x y (lambda (x y same-leaf)
+ (logand-derive-type-aux
+ (lognot-derive-type-aux x) y nil))
+ #'logandc1))
+(defoptimizer (logandc2 derive-type) ((x y))
+ (two-arg-derive-type x y (lambda (x y same-leaf)
+ (logand-derive-type-aux
+ x (lognot-derive-type-aux y) nil))
+ #'logandc2))
+(defoptimizer (logorc1 derive-type) ((x y))
+ (two-arg-derive-type x y (lambda (x y same-leaf)
+ (logior-derive-type-aux
+ (lognot-derive-type-aux x) y nil))
+ #'logorc1))
+(defoptimizer (logorc2 derive-type) ((x y))
+ (two-arg-derive-type x y (lambda (x y same-leaf)
+ (logior-derive-type-aux
+ x (lognot-derive-type-aux y) nil))
+ #'logorc2))
\f
;;;; miscellaneous derive-type methods
(defoptimizer (integer-length derive-type) ((x))
(let ((x-type (lvar-type x)))
- (when (and (numeric-type-p x-type)
- (csubtypep x-type (specifier-type 'integer)))
+ (when (numeric-type-p x-type)
;; 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
(setf min-len 0))
(specifier-type `(integer ,(or min-len '*) ,(or max-len '*))))))))
+(defoptimizer (isqrt derive-type) ((x))
+ (let ((x-type (lvar-type x)))
+ (when (numeric-type-p x-type)
+ (let* ((lo (numeric-type-low x-type))
+ (hi (numeric-type-high x-type))
+ (lo-res (if lo (isqrt lo) '*))
+ (hi-res (if hi (isqrt hi) '*)))
+ (specifier-type `(integer ,lo-res ,hi-res))))))
+
(defoptimizer (code-char derive-type) ((code))
(specifier-type 'base-char))
(defoptimizer (values derive-type) ((&rest values))
(make-values-type :required (mapcar #'lvar-type values)))
+
+(defun signum-derive-type-aux (type)
+ (if (eq (numeric-type-complexp type) :complex)
+ (let* ((format (case (numeric-type-class type)
+ ((integer rational) 'single-float)
+ (t (numeric-type-format type))))
+ (bound-format (or format 'float)))
+ (make-numeric-type :class 'float
+ :format format
+ :complexp :complex
+ :low (coerce -1 bound-format)
+ :high (coerce 1 bound-format)))
+ (let* ((interval (numeric-type->interval type))
+ (range-info (interval-range-info interval))
+ (contains-0-p (interval-contains-p 0 interval))
+ (class (numeric-type-class type))
+ (format (numeric-type-format type))
+ (one (coerce 1 (or format class 'real)))
+ (zero (coerce 0 (or format class 'real)))
+ (minus-one (coerce -1 (or format class 'real)))
+ (plus (make-numeric-type :class class :format format
+ :low one :high one))
+ (minus (make-numeric-type :class class :format format
+ :low minus-one :high minus-one))
+ ;; KLUDGE: here we have a fairly horrible hack to deal
+ ;; with the schizophrenia in the type derivation engine.
+ ;; The problem is that the type derivers reinterpret
+ ;; numeric types as being exact; so (DOUBLE-FLOAT 0d0
+ ;; 0d0) within the derivation mechanism doesn't include
+ ;; -0d0. Ugh. So force it in here, instead.
+ (zero (make-numeric-type :class class :format format
+ :low (- zero) :high zero)))
+ (case range-info
+ (+ (if contains-0-p (type-union plus zero) plus))
+ (- (if contains-0-p (type-union minus zero) minus))
+ (t (type-union minus zero plus))))))
+
+(defoptimizer (signum derive-type) ((num))
+ (one-arg-derive-type num #'signum-derive-type-aux nil))
\f
;;;; byte operations
;;;;
;;;
;;; and similar for other arguments.
-;;; Try to recursively cut all uses of the continuation CONT to WIDTH
-;;; bits.
+;;; Try to recursively cut all uses of LVAR to WIDTH bits.
;;;
;;; For good functions, we just recursively cut arguments; their
;;; "goodness" means that the result will not increase (in the
;;; (unsigned-byte +infinity) sense). An ordinary modular function is
;;; replaced with the version, cutting its result to WIDTH or more
-;;; bits. If we have changed anything, we need to flush old derived
-;;; types, because they have nothing in common with the new code.
+;;; bits. For most functions (e.g. for +) we cut all arguments; for
+;;; others (e.g. for ASH) we have "optimizers", cutting only necessary
+;;; arguments (maybe to a different width) and returning the name of a
+;;; modular version, if it exists, or NIL. If we have changed
+;;; anything, we need to flush old derived types, because they have
+;;; nothing in common with the new code.
(defun cut-to-width (lvar width)
(declare (type lvar lvar) (type (integer 0) width))
(labels ((reoptimize-node (node name)
(setf (block-reoptimize (node-block node)) t)
(setf (component-reoptimize (node-component node)) t))
(cut-node (node &aux did-something)
- (when (and (combination-p node)
- (fun-info-p (basic-combination-kind node)))
+ (when (and (not (block-delete-p (node-block node)))
+ (combination-p node)
+ (eq (basic-combination-kind node) :known))
(let* ((fun-ref (lvar-use (combination-fun node)))
(fun-name (leaf-source-name (ref-leaf fun-ref)))
- (modular-fun (find-modular-version fun-name width))
- (name (and (modular-fun-info-p modular-fun)
- (modular-fun-info-name modular-fun))))
+ (modular-fun (find-modular-version fun-name width)))
(when (and modular-fun
- (not (and (eq name 'logand)
+ (not (and (eq fun-name 'logand)
(csubtypep
(single-value-type (node-derived-type node))
- (specifier-type `(unsigned-byte ,width))))))
- (unless (eq modular-fun :good)
- (setq did-something t)
- (change-ref-leaf
+ (specifier-type `(unsigned-byte* ,width))))))
+ (binding* ((name (etypecase modular-fun
+ ((eql :good) fun-name)
+ (modular-fun-info
+ (modular-fun-info-name modular-fun))
+ (function
+ (funcall modular-fun node width)))
+ :exit-if-null))
+ (unless (eql modular-fun :good)
+ (setq did-something t)
+ (change-ref-leaf
fun-ref
(find-free-fun name "in a strange place"))
(setf (combination-kind node) :full))
- (dolist (arg (basic-combination-args node))
- (when (cut-lvar arg)
- (setq did-something t)))
- (when did-something
- (reoptimize-node node fun-name))
- did-something))))
+ (unless (functionp modular-fun)
+ (dolist (arg (basic-combination-args node))
+ (when (cut-lvar arg)
+ (setq did-something t))))
+ (when did-something
+ (reoptimize-node node name))
+ did-something)))))
(cut-lvar (lvar &aux did-something)
(do-uses (node lvar)
(when (cut-node node)
(give-up-ir1-transform "BOOLE code is not a constant."))
(let ((control (lvar-value op)))
(case control
- (#.boole-clr 0)
- (#.boole-set -1)
- (#.boole-1 'x)
- (#.boole-2 'y)
- (#.boole-c1 '(lognot x))
- (#.boole-c2 '(lognot y))
- (#.boole-and '(logand x y))
- (#.boole-ior '(logior x y))
- (#.boole-xor '(logxor x y))
- (#.boole-eqv '(logeqv x y))
- (#.boole-nand '(lognand x y))
- (#.boole-nor '(lognor x y))
- (#.boole-andc1 '(logandc1 x y))
- (#.boole-andc2 '(logandc2 x y))
- (#.boole-orc1 '(logorc1 x y))
- (#.boole-orc2 '(logorc2 x y))
+ (#.sb!xc:boole-clr 0)
+ (#.sb!xc:boole-set -1)
+ (#.sb!xc:boole-1 'x)
+ (#.sb!xc:boole-2 'y)
+ (#.sb!xc:boole-c1 '(lognot x))
+ (#.sb!xc:boole-c2 '(lognot y))
+ (#.sb!xc:boole-and '(logand x y))
+ (#.sb!xc:boole-ior '(logior x y))
+ (#.sb!xc:boole-xor '(logxor x y))
+ (#.sb!xc:boole-eqv '(logeqv x y))
+ (#.sb!xc:boole-nand '(lognand x y))
+ (#.sb!xc:boole-nor '(lognor x y))
+ (#.sb!xc:boole-andc1 '(logandc1 x y))
+ (#.sb!xc:boole-andc2 '(logandc2 x y))
+ (#.sb!xc:boole-orc1 '(logorc1 x y))
+ (#.sb!xc:boole-orc2 '(logorc2 x y))
(t
(abort-ir1-transform "~S is an illegal control arg to BOOLE."
control)))))
`(- (ash (- x) ,shift)))
(- (logand (- x) ,mask)))
(values ,(if (minusp y)
- `(- (ash (- x) ,shift))
+ `(ash (- ,mask x) ,shift)
`(ash x ,shift))
(logand x ,mask))))))
"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
+;;; Return T if in an arithmetic op including lvars 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)
\f
;;;; equality predicate transforms
-;;; Return true if X and Y are continuations whose only use is a
+;;; Return true if X and Y are lvars 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)
(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 LVAR's type is a numeric type, then return the type, otherwise
;;; GIVE-UP-IR1-TRANSFORM.
(defun numeric-type-or-lose (lvar)
(declare (type lvar lvar))
;;; 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.
-;;;
-;;; 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
- (let* ((x-type (numeric-type-or-lose x))
- (x-lo (numeric-type-low x-type))
- (x-hi (numeric-type-high x-type))
- (y-type (numeric-type-or-lose y))
- (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)
- ((and y-hi x-lo (>= x-lo y-hi))
- nil)
- ((and (constant-lvar-p first)
- (not (constant-lvar-p second)))
- `(,inverse y x))
- (t
- (give-up-ir1-transform))))))
-#-sb-xc-host ; (See CROSS-FLOAT-INFINITY-KLUDGE.)
-(defun ir1-transform-< (x y first second inverse)
- (if (same-leaf-ref-p x y)
- 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)
- ((interval->= xi yi)
- nil)
- ((and (constant-lvar-p first)
- (not (constant-lvar-p second)))
- `(,inverse y x))
- (t
- (give-up-ir1-transform))))))
-
-(deftransform < ((x y) (integer integer) *)
- (ir1-transform-< x y x y '>))
-
-(deftransform > ((x y) (integer integer) *)
- (ir1-transform-< y x x y '<))
-
-#-sb-xc-host ; (See CROSS-FLOAT-INFINITY-KLUDGE.)
-(deftransform < ((x y) (float float) *)
- (ir1-transform-< x y x y '>))
-
-#-sb-xc-host ; (See CROSS-FLOAT-INFINITY-KLUDGE.)
-(deftransform > ((x y) (float float) *)
- (ir1-transform-< y x x y '<))
+(macrolet ((def (name inverse reflexive-p surely-true surely-false)
+ `(deftransform ,name ((x y))
+ (if (same-leaf-ref-p x y)
+ ,reflexive-p
+ (let ((ix (or (type-approximate-interval (lvar-type x))
+ (give-up-ir1-transform)))
+ (iy (or (type-approximate-interval (lvar-type y))
+ (give-up-ir1-transform))))
+ (cond (,surely-true
+ t)
+ (,surely-false
+ nil)
+ ((and (constant-lvar-p x)
+ (not (constant-lvar-p y)))
+ `(,',inverse y x))
+ (t
+ (give-up-ir1-transform))))))))
+ (def < > nil (interval-< ix iy) (interval->= ix iy))
+ (def > < nil (interval-< iy ix) (interval->= iy ix))
+ (def <= >= t (interval->= iy ix) (interval-< iy ix))
+ (def >= <= t (interval->= ix iy) (interval-< ix iy)))
(defun ir1-transform-char< (x y first second inverse)
(cond
((same-leaf-ref-p x y) nil)
;; If we had interval representation of character types, as we
;; might eventually have to to support 2^21 characters, then here
- ;; we could do some compile-time computation as in IR1-TRANSFORM-<
- ;; above. -- CSR, 2003-07-01
+ ;; we could do some compile-time computation as in transforms for
+ ;; < above. -- CSR, 2003-07-01
((and (constant-lvar-p first)
(not (constant-lvar-p second)))
`(,inverse y x))
(if (null rest)
`(values (the real ,arg0))
`(let ((maxrest (max ,@rest)))
- (if (> ,arg0 maxrest) ,arg0 maxrest)))))
+ (if (>= ,arg0 maxrest) ,arg0 maxrest)))))
(define-source-transform min (arg0 &rest rest)
(once-only ((arg0 arg0))
(if (null rest)
`(values (the real ,arg0))
`(let ((minrest (min ,@rest)))
- (if (< ,arg0 minrest) ,arg0 minrest)))))
+ (if (<= ,arg0 minrest) ,arg0 minrest)))))
\f
;;;; converting N-arg arithmetic functions
;;;;
(source-transform-transitive 'logxor args 0 'integer))
(define-source-transform logand (&rest args)
(source-transform-transitive 'logand args -1 'integer))
-
(define-source-transform logeqv (&rest args)
- (if (evenp (length args))
- `(lognot (logxor ,@args))
- `(logxor ,@args)))
+ (source-transform-transitive 'logeqv args -1 'integer))
;;; Note: we can't use SOURCE-TRANSFORM-TRANSITIVE for GCD and LCM
;;; because when they are given one argument, they return its absolute
;;; "optimizer" (say, DEFOPTIMIZER CONSISTENCY-CHECK).
;;;
;;; FIXME II: In some cases, type information could be correlated; for
-;;; instance, ~{ ... ~} requires a list argument, so if the
-;;; continuation-type of a corresponding argument is known and does
-;;; not intersect the list type, a warning could be signalled.
+;;; instance, ~{ ... ~} requires a list argument, so if the lvar-type
+;;; of a corresponding argument is known and does not intersect the
+;;; list type, a warning could be signalled.
(defun check-format-args (string args fun)
(declare (type string string))
(unless (typep string 'simple-string)
(t
*universal-type*)))))
+;;; Like CMU CL, we use HEAPSORT. However, other than that, this code
+;;; isn't really related to the CMU CL code, since instead of trying
+;;; to generalize the CMU CL code to allow START and END values, this
+;;; code has been written from scratch following Chapter 7 of
+;;; _Introduction to Algorithms_ by Corman, Rivest, and Shamir.
(define-source-transform sb!impl::sort-vector (vector start end predicate key)
+ ;; Like CMU CL, we use HEAPSORT. However, other than that, this code
+ ;; isn't really related to the CMU CL code, since instead of trying
+ ;; to generalize the CMU CL code to allow START and END values, this
+ ;; code has been written from scratch following Chapter 7 of
+ ;; _Introduction to Algorithms_ by Corman, Rivest, and Shamir.
`(macrolet ((%index (x) `(truly-the index ,x))
(%parent (i) `(ash ,i -1))
(%left (i) `(%index (ash ,i 1)))
(%elt largest) i-elt
i largest)))))))))
(%sort-vector (keyfun &optional (vtype 'vector))
- `(macrolet (;; KLUDGE: In SBCL ca. 0.6.10, I had trouble getting
- ;; type inference to propagate all the way
- ;; through this tangled mess of
- ;; inlining. The TRULY-THE here works
- ;; around that. -- WHN
+ `(macrolet (;; KLUDGE: In SBCL ca. 0.6.10, I had
+ ;; trouble getting type inference to
+ ;; propagate all the way through this
+ ;; tangled mess of inlining. The TRULY-THE
+ ;; here works around that. -- WHN
(%elt (i)
`(aref (truly-the ,',vtype ,',',vector)
(%index (+ (%index ,i) start-1)))))
- (let ((start-1 (1- ,',start)) ; Heaps prefer 1-based addressing.
+ (let (;; Heaps prefer 1-based addressing.
+ (start-1 (1- ,',start))
(current-heap-size (- ,',end ,',start))
(keyfun ,keyfun))
(declare (type (integer -1 #.(1- most-positive-fixnum))
;;; 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")
+;;; (sb-c::/report-lvar s "S outside WHEN")
;;; (when (and (integerp s) (> s 3))
-;;; (sb-c::/report-continuation s "S inside WHEN")
+;;; (sb-c::/report-lvar s "S inside WHEN")
;;; (let ((bound (ash 1 (1- s))))
-;;; (sb-c::/report-continuation bound "BOUND")
+;;; (sb-c::/report-lvar bound "BOUND")
;;; (let ((x (- bound))
;;; (y (1- bound)))
-;;; (sb-c::/report-continuation x "X")
-;;; (sb-c::/report-continuation x "Y"))
+;;; (sb-c::/report-lvar x "X")
+;;; (sb-c::/report-lvar 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.)