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1 /* Operations with very long integers. -*- C++ -*-
2 Copyright (C) 2012-2017 Free Software Foundation, Inc.
4 This file is part of GCC.
6 GCC is free software; you can redistribute it and/or modify it
7 under the terms of the GNU General Public License as published by the
8 Free Software Foundation; either version 3, or (at your option) any
9 later version.
11 GCC is distributed in the hope that it will be useful, but WITHOUT
12 ANY WARRANTY; without even the implied warranty of MERCHANTABILITY or
13 FITNESS FOR A PARTICULAR PURPOSE. See the GNU General Public License
14 for more details.
16 You should have received a copy of the GNU General Public License
17 along with GCC; see the file COPYING3. If not see
18 <http://www.gnu.org/licenses/>. */
20 #ifndef WIDE_INT_H
21 #define WIDE_INT_H
23 /* wide-int.[cc|h] implements a class that efficiently performs
24 mathematical operations on finite precision integers. wide_ints
25 are designed to be transient - they are not for long term storage
26 of values. There is tight integration between wide_ints and the
27 other longer storage GCC representations (rtl and tree).
29 The actual precision of a wide_int depends on the flavor. There
30 are three predefined flavors:
32 1) wide_int (the default). This flavor does the math in the
33 precision of its input arguments. It is assumed (and checked)
34 that the precisions of the operands and results are consistent.
35 This is the most efficient flavor. It is not possible to examine
36 bits above the precision that has been specified. Because of
37 this, the default flavor has semantics that are simple to
38 understand and in general model the underlying hardware that the
39 compiler is targetted for.
41 This flavor must be used at the RTL level of gcc because there
42 is, in general, not enough information in the RTL representation
43 to extend a value beyond the precision specified in the mode.
45 This flavor should also be used at the TREE and GIMPLE levels of
46 the compiler except for the circumstances described in the
47 descriptions of the other two flavors.
49 The default wide_int representation does not contain any
50 information inherent about signedness of the represented value,
51 so it can be used to represent both signed and unsigned numbers.
52 For operations where the results depend on signedness (full width
53 multiply, division, shifts, comparisons, and operations that need
54 overflow detected), the signedness must be specified separately.
56 2) offset_int. This is a fixed-precision integer that can hold
57 any address offset, measured in either bits or bytes, with at
58 least one extra sign bit. At the moment the maximum address
59 size GCC supports is 64 bits. With 8-bit bytes and an extra
60 sign bit, offset_int therefore needs to have at least 68 bits
61 of precision. We round this up to 128 bits for efficiency.
62 Values of type T are converted to this precision by sign- or
63 zero-extending them based on the signedness of T.
65 The extra sign bit means that offset_int is effectively a signed
66 128-bit integer, i.e. it behaves like int128_t.
68 Since the values are logically signed, there is no need to
69 distinguish between signed and unsigned operations. Sign-sensitive
70 comparison operators <, <=, > and >= are therefore supported.
71 Shift operators << and >> are also supported, with >> being
72 an _arithmetic_ right shift.
74 [ Note that, even though offset_int is effectively int128_t,
75 it can still be useful to use unsigned comparisons like
76 wi::leu_p (a, b) as a more efficient short-hand for
77 "a >= 0 && a <= b". ]
79 3) widest_int. This representation is an approximation of
80 infinite precision math. However, it is not really infinite
81 precision math as in the GMP library. It is really finite
82 precision math where the precision is 4 times the size of the
83 largest integer that the target port can represent.
85 Like offset_int, widest_int is wider than all the values that
86 it needs to represent, so the integers are logically signed.
87 Sign-sensitive comparison operators <, <=, > and >= are supported,
88 as are << and >>.
90 There are several places in the GCC where this should/must be used:
92 * Code that does induction variable optimizations. This code
93 works with induction variables of many different types at the
94 same time. Because of this, it ends up doing many different
95 calculations where the operands are not compatible types. The
96 widest_int makes this easy, because it provides a field where
97 nothing is lost when converting from any variable,
99 * There are a small number of passes that currently use the
100 widest_int that should use the default. These should be
101 changed.
103 There are surprising features of offset_int and widest_int
104 that the users should be careful about:
106 1) Shifts and rotations are just weird. You have to specify a
107 precision in which the shift or rotate is to happen in. The bits
108 above this precision are zeroed. While this is what you
109 want, it is clearly non obvious.
111 2) Larger precision math sometimes does not produce the same
112 answer as would be expected for doing the math at the proper
113 precision. In particular, a multiply followed by a divide will
114 produce a different answer if the first product is larger than
115 what can be represented in the input precision.
117 The offset_int and the widest_int flavors are more expensive
118 than the default wide int, so in addition to the caveats with these
119 two, the default is the prefered representation.
121 All three flavors of wide_int are represented as a vector of
122 HOST_WIDE_INTs. The default and widest_int vectors contain enough elements
123 to hold a value of MAX_BITSIZE_MODE_ANY_INT bits. offset_int contains only
124 enough elements to hold ADDR_MAX_PRECISION bits. The values are stored
125 in the vector with the least significant HOST_BITS_PER_WIDE_INT bits
126 in element 0.
128 The default wide_int contains three fields: the vector (VAL),
129 the precision and a length (LEN). The length is the number of HWIs
130 needed to represent the value. widest_int and offset_int have a
131 constant precision that cannot be changed, so they only store the
132 VAL and LEN fields.
134 Since most integers used in a compiler are small values, it is
135 generally profitable to use a representation of the value that is
136 as small as possible. LEN is used to indicate the number of
137 elements of the vector that are in use. The numbers are stored as
138 sign extended numbers as a means of compression. Leading
139 HOST_WIDE_INTs that contain strings of either -1 or 0 are removed
140 as long as they can be reconstructed from the top bit that is being
141 represented.
143 The precision and length of a wide_int are always greater than 0.
144 Any bits in a wide_int above the precision are sign-extended from the
145 most significant bit. For example, a 4-bit value 0x8 is represented as
146 VAL = { 0xf...fff8 }. However, as an optimization, we allow other integer
147 constants to be represented with undefined bits above the precision.
148 This allows INTEGER_CSTs to be pre-extended according to TYPE_SIGN,
149 so that the INTEGER_CST representation can be used both in TYPE_PRECISION
150 and in wider precisions.
152 There are constructors to create the various forms of wide_int from
153 trees, rtl and constants. For trees you can simply say:
155 tree t = ...;
156 wide_int x = t;
158 However, a little more syntax is required for rtl constants since
159 they do not have an explicit precision. To make an rtl into a
160 wide_int, you have to pair it with a mode. The canonical way to do
161 this is with rtx_mode_t as in:
163 rtx r = ...
164 wide_int x = rtx_mode_t (r, mode);
166 Similarly, a wide_int can only be constructed from a host value if
167 the target precision is given explicitly, such as in:
169 wide_int x = wi::shwi (c, prec); // sign-extend C if necessary
170 wide_int y = wi::uhwi (c, prec); // zero-extend C if necessary
172 However, offset_int and widest_int have an inherent precision and so
173 can be initialized directly from a host value:
175 offset_int x = (int) c; // sign-extend C
176 widest_int x = (unsigned int) c; // zero-extend C
178 It is also possible to do arithmetic directly on trees, rtxes and
179 constants. For example:
181 wi::add (t1, t2); // add equal-sized INTEGER_CSTs t1 and t2
182 wi::add (t1, 1); // add 1 to INTEGER_CST t1
183 wi::add (r1, r2); // add equal-sized rtx constants r1 and r2
184 wi::lshift (1, 100); // 1 << 100 as a widest_int
186 Many binary operations place restrictions on the combinations of inputs,
187 using the following rules:
189 - {tree, rtx, wide_int} op {tree, rtx, wide_int} -> wide_int
190 The inputs must be the same precision. The result is a wide_int
191 of the same precision
193 - {tree, rtx, wide_int} op (un)signed HOST_WIDE_INT -> wide_int
194 (un)signed HOST_WIDE_INT op {tree, rtx, wide_int} -> wide_int
195 The HOST_WIDE_INT is extended or truncated to the precision of
196 the other input. The result is a wide_int of the same precision
197 as that input.
199 - (un)signed HOST_WIDE_INT op (un)signed HOST_WIDE_INT -> widest_int
200 The inputs are extended to widest_int precision and produce a
201 widest_int result.
203 - offset_int op offset_int -> offset_int
204 offset_int op (un)signed HOST_WIDE_INT -> offset_int
205 (un)signed HOST_WIDE_INT op offset_int -> offset_int
207 - widest_int op widest_int -> widest_int
208 widest_int op (un)signed HOST_WIDE_INT -> widest_int
209 (un)signed HOST_WIDE_INT op widest_int -> widest_int
211 Other combinations like:
213 - widest_int op offset_int and
214 - wide_int op offset_int
216 are not allowed. The inputs should instead be extended or truncated
217 so that they match.
219 The inputs to comparison functions like wi::eq_p and wi::lts_p
220 follow the same compatibility rules, although their return types
221 are different. Unary functions on X produce the same result as
222 a binary operation X + X. Shift functions X op Y also produce
223 the same result as X + X; the precision of the shift amount Y
224 can be arbitrarily different from X. */
226 /* The MAX_BITSIZE_MODE_ANY_INT is automatically generated by a very
227 early examination of the target's mode file. The WIDE_INT_MAX_ELTS
228 can accomodate at least 1 more bit so that unsigned numbers of that
229 mode can be represented as a signed value. Note that it is still
230 possible to create fixed_wide_ints that have precisions greater than
231 MAX_BITSIZE_MODE_ANY_INT. This can be useful when representing a
232 double-width multiplication result, for example. */
233 #define WIDE_INT_MAX_ELTS \
234 ((MAX_BITSIZE_MODE_ANY_INT + HOST_BITS_PER_WIDE_INT) / HOST_BITS_PER_WIDE_INT)
236 #define WIDE_INT_MAX_PRECISION (WIDE_INT_MAX_ELTS * HOST_BITS_PER_WIDE_INT)
238 /* This is the max size of any pointer on any machine. It does not
239 seem to be as easy to sniff this out of the machine description as
240 it is for MAX_BITSIZE_MODE_ANY_INT since targets may support
241 multiple address sizes and may have different address sizes for
242 different address spaces. However, currently the largest pointer
243 on any platform is 64 bits. When that changes, then it is likely
244 that a target hook should be defined so that targets can make this
245 value larger for those targets. */
246 #define ADDR_MAX_BITSIZE 64
248 /* This is the internal precision used when doing any address
249 arithmetic. The '4' is really 3 + 1. Three of the bits are for
250 the number of extra bits needed to do bit addresses and the other bit
251 is to allow everything to be signed without loosing any precision.
252 Then everything is rounded up to the next HWI for efficiency. */
253 #define ADDR_MAX_PRECISION \
254 ((ADDR_MAX_BITSIZE + 4 + HOST_BITS_PER_WIDE_INT - 1) \
255 & ~(HOST_BITS_PER_WIDE_INT - 1))
257 /* The number of HWIs needed to store an offset_int. */
258 #define OFFSET_INT_ELTS (ADDR_MAX_PRECISION / HOST_BITS_PER_WIDE_INT)
260 /* The type of result produced by a binary operation on types T1 and T2.
261 Defined purely for brevity. */
262 #define WI_BINARY_RESULT(T1, T2) \
263 typename wi::binary_traits <T1, T2>::result_type
265 /* The type of result produced by T1 << T2. Leads to substitution failure
266 if the operation isn't supported. Defined purely for brevity. */
267 #define WI_SIGNED_SHIFT_RESULT(T1, T2) \
268 typename wi::binary_traits <T1, T2>::signed_shift_result_type
270 /* The type of result produced by a signed binary predicate on types T1 and T2.
271 This is bool if signed comparisons make sense for T1 and T2 and leads to
272 substitution failure otherwise. */
273 #define WI_SIGNED_BINARY_PREDICATE_RESULT(T1, T2) \
274 typename wi::binary_traits <T1, T2>::signed_predicate_result
276 /* The type of result produced by a unary operation on type T. */
277 #define WI_UNARY_RESULT(T) \
278 typename wi::unary_traits <T>::result_type
280 /* Define a variable RESULT to hold the result of a binary operation on
281 X and Y, which have types T1 and T2 respectively. Define VAL to
282 point to the blocks of RESULT. Once the user of the macro has
283 filled in VAL, it should call RESULT.set_len to set the number
284 of initialized blocks. */
285 #define WI_BINARY_RESULT_VAR(RESULT, VAL, T1, X, T2, Y) \
286 WI_BINARY_RESULT (T1, T2) RESULT = \
287 wi::int_traits <WI_BINARY_RESULT (T1, T2)>::get_binary_result (X, Y); \
288 HOST_WIDE_INT *VAL = RESULT.write_val ()
290 /* Similar for the result of a unary operation on X, which has type T. */
291 #define WI_UNARY_RESULT_VAR(RESULT, VAL, T, X) \
292 WI_UNARY_RESULT (T) RESULT = \
293 wi::int_traits <WI_UNARY_RESULT (T)>::get_binary_result (X, X); \
294 HOST_WIDE_INT *VAL = RESULT.write_val ()
300 /* An N-bit integer. Until we can use typedef templates, use this instead. */
301 #define FIXED_WIDE_INT(N) \
302 generic_wide_int < fixed_wide_int_storage <N> >
313 /* This can be used instead of wide_int_ref if the referenced value is
314 known to have type T. It carries across properties of T's representation,
315 such as whether excess upper bits in a HWI are defined, and can therefore
316 help avoid redundant work.
318 The macro could be replaced with a template typedef, once we're able
319 to use those. */
320 #define WIDE_INT_REF_FOR(T) \
321 generic_wide_int \
322 <wide_int_ref_storage <wi::int_traits <T>::is_sign_extended> >
324 namespace wi
325 {
326 /* Classifies an integer based on its precision. */
328 /* The integer has both a precision and defined signedness. This allows
329 the integer to be converted to any width, since we know whether to fill
330 any extra bits with zeros or signs. */
331 FLEXIBLE_PRECISION,
333 /* The integer has a variable precision but no defined signedness. */
334 VAR_PRECISION,
336 /* The integer has a constant precision (known at GCC compile time)
337 and is signed. */
338 CONST_PRECISION
339 };
341 /* This class, which has no default implementation, is expected to
342 provide the following members:
344 static const enum precision_type precision_type;
345 Classifies the type of T.
347 static const unsigned int precision;
348 Only defined if precision_type == CONST_PRECISION. Specifies the
349 precision of all integers of type T.
351 static const bool host_dependent_precision;
352 True if the precision of T depends (or can depend) on the host.
354 static unsigned int get_precision (const T &x)
355 Return the number of bits in X.
357 static wi::storage_ref *decompose (HOST_WIDE_INT *scratch,
358 unsigned int precision, const T &x)
359 Decompose X as a PRECISION-bit integer, returning the associated
360 wi::storage_ref. SCRATCH is available as scratch space if needed.
361 The routine should assert that PRECISION is acceptable. */
364 /* This class provides a single type, result_type, which specifies the
365 type of integer produced by a binary operation whose inputs have
366 types T1 and T2. The definition should be symmetric. */
372 /* The result of a unary operation on T is the same as the result of
373 a binary operation on two values of type T. */
377 /* Specify the result type for each supported combination of binary
378 inputs. Note that CONST_PRECISION and VAR_PRECISION cannot be
379 mixed, in order to give stronger type checking. When both inputs
380 are CONST_PRECISION, they must have the same precision. */
383 {
385 };
389 {
391 };
395 {
396 /* Spelled out explicitly (rather than through FIXED_WIDE_INT)
397 so as not to confuse gengtype. */
401 };
405 {
407 };
411 {
412 /* Spelled out explicitly (rather than through FIXED_WIDE_INT)
413 so as not to confuse gengtype. */
418 };
422 {
423 /* Spelled out explicitly (rather than through FIXED_WIDE_INT)
424 so as not to confuse gengtype. */
430 };
434 {
436 };
437 }
439 /* Public functions for querying and operating on integers. */
440 namespace wi
441 {
451 #define UNARY_PREDICATE \
452 template <typename T> bool
453 #define UNARY_FUNCTION \
454 template <typename T> WI_UNARY_RESULT (T)
455 #define BINARY_PREDICATE \
456 template <typename T1, typename T2> bool
457 #define BINARY_FUNCTION \
458 template <typename T1, typename T2> WI_BINARY_RESULT (T1, T2)
459 #define SHIFT_FUNCTION \
460 template <typename T1, typename T2> WI_UNARY_RESULT (T1)
556 #undef SHIFT_FUNCTION
557 #undef BINARY_PREDICATE
558 #undef BINARY_FUNCTION
559 #undef UNARY_PREDICATE
560 #undef UNARY_FUNCTION
578 }
580 namespace wi
581 {
582 /* Contains the components of a decomposed integer for easy, direct
583 access. */
584 struct storage_ref
585 {
592 /* Provide enough trappings for this class to act as storage for
593 generic_wide_int. */
597 };
598 }
604 {
605 }
609 {
611 }
615 {
617 }
621 {
623 }
625 /* This class defines an integer type using the storage provided by the
626 template argument. The storage class must provide the following
627 functions:
629 unsigned int get_precision () const
630 Return the number of bits in the integer.
632 HOST_WIDE_INT *get_val () const
633 Return a pointer to the array of blocks that encodes the integer.
635 unsigned int get_len () const
636 Return the number of blocks in get_val (). If this is smaller
637 than the number of blocks implied by get_precision (), the
638 remaining blocks are sign extensions of block get_len () - 1.
640 Although not required by generic_wide_int itself, writable storage
641 classes can also provide the following functions:
643 HOST_WIDE_INT *write_val ()
644 Get a modifiable version of get_val ()
646 unsigned int set_len (unsigned int len)
647 Set the value returned by get_len () to LEN. */
650 {
660 /* Conversions. */
667 /* Public accessors for the interior of a wide int. */
678 #define BINARY_PREDICATE(OP, F) \
679 template <typename T> \
680 bool OP (const T &c) const { return wi::F (*this, c); }
682 #define UNARY_OPERATOR(OP, F) \
683 WI_UNARY_RESULT (generic_wide_int) OP () const { return wi::F (*this); }
685 #define BINARY_OPERATOR(OP, F) \
686 template <typename T> \
687 WI_BINARY_RESULT (generic_wide_int, T) \
688 OP (const T &c) const { return wi::F (*this, c); }
690 #define ASSIGNMENT_OPERATOR(OP, F) \
691 template <typename T> \
692 generic_wide_int &OP (const T &c) { return (*this = wi::F (*this, c)); }
694 /* Restrict these to cases where the shift operator is defined. */
695 #define SHIFT_ASSIGNMENT_OPERATOR(OP, OP2) \
696 template <typename T> \
697 generic_wide_int &OP (const T &c) { return (*this = *this OP2 c); }
699 #define INCDEC_OPERATOR(OP, DELTA) \
700 generic_wide_int &OP () { *this += DELTA; return *this; }
725 #undef BINARY_PREDICATE
726 #undef UNARY_OPERATOR
727 #undef BINARY_OPERATOR
728 #undef SHIFT_ASSIGNMENT_OPERATOR
729 #undef ASSIGNMENT_OPERATOR
730 #undef INCDEC_OPERATOR
732 /* Debugging functions. */
735 static const bool is_sign_extended
737 };
746 {
747 }
754 {
755 }
757 /* Return THIS as a signed HOST_WIDE_INT, sign-extending from PRECISION.
758 If THIS does not fit in PRECISION, the information is lost. */
760 inline HOST_WIDE_INT
762 {
765 else
767 }
769 /* Return THIS as a signed HOST_WIDE_INT, in its natural precision. */
771 inline HOST_WIDE_INT
773 {
776 else
778 }
780 /* Return THIS as an unsigned HOST_WIDE_INT, zero-extending from
781 PRECISION. If THIS does not fit in PRECISION, the information
782 is lost. */
786 {
789 else
791 }
793 /* Return THIS as an signed HOST_WIDE_INT, in its natural precision. */
797 {
799 }
801 /* TODO: The compiler is half converted from using HOST_WIDE_INT to
802 represent addresses to using offset_int to represent addresses.
803 We use to_short_addr at the interface from new code to old,
804 unconverted code. */
806 inline HOST_WIDE_INT
808 {
810 }
812 /* Return the implicit value of blocks above get_len (). */
814 inline HOST_WIDE_INT
816 {
820 {
825 }
827 }
829 /* Return the signed value of the least-significant explicitly-encoded
830 block. */
832 inline HOST_WIDE_INT
834 {
836 }
838 /* Return the signed value of the most-significant explicitly-encoded
839 block. */
841 inline HOST_WIDE_INT
843 {
845 }
847 /* Return the unsigned value of the least-significant
848 explicitly-encoded block. */
852 {
854 }
856 /* Return the unsigned value of the most-significant
857 explicitly-encoded block. */
861 {
863 }
865 /* Return block I, which might be implicitly or explicit encoded. */
867 inline HOST_WIDE_INT
869 {
872 else
874 }
880 {
883 }
885 /* Dump the contents of the integer to stderr, for debugging. */
887 void
889 {
900 }
902 namespace wi
903 {
907 {
911 };
912 }
918 {
920 }
927 {
930 }
932 /* Provide the storage for a wide_int_ref. This acts like a read-only
933 wide_int, with the optimization that VAL is normally a pointer to
934 another integer's storage, so that no array copy is needed. */
937 {
939 /* Scratch space that can be used when decomposing the original integer.
940 It must live as long as this object. */
951 };
953 /* Create a reference from an existing reference. */
958 {}
960 /* Create a reference to integer X in its natural precision. Note
961 that the natural precision is host-dependent for primitive
962 types. */
968 {
969 }
971 /* Create a reference to integer X in precision PRECISION. */
977 {
978 }
980 namespace wi
981 {
984 {
986 /* wi::storage_ref can be a reference to a primitive type,
987 so this is the conservatively-correct setting. */
990 };
991 }
993 namespace wi
994 {
997 signop sgn);
1000 }
1002 /* The storage used by wide_int. */
1004 {
1015 /* The standard generic_wide_int storage methods. */
1030 /* FIXME: target-dependent, so should disappear. */
1032 };
1034 namespace wi
1035 {
1038 {
1040 /* Guaranteed by a static assert in the wide_int_storage constructor. */
1045 };
1046 }
1050 /* Initialize the storage from integer X, in its natural precision.
1051 Note that we do not allow integers with host-dependent precision
1052 to become wide_ints; wide_ints must always be logically independent
1053 of the host. */
1056 {
1062 }
1067 {
1074 }
1078 {
1080 }
1084 {
1086 }
1090 {
1092 }
1096 {
1098 }
1102 {
1107 }
1109 /* Treat X as having signedness SGN and convert it to a PRECISION-bit
1110 number. */
1111 inline wide_int
1113 signop sgn)
1114 {
1119 }
1121 /* Create a wide_int from the explicit block encoding given by VAL and
1122 LEN. PRECISION is the precision of the integer. NEED_CANON_P is
1123 true if the encoding may have redundant trailing blocks. */
1124 inline wide_int
1127 {
1130 need_canon_p));
1132 }
1134 /* Return an uninitialized wide_int with precision PRECISION. */
1135 inline wide_int
1137 {
1138 wide_int x;
1141 }
1144 inline wide_int
1146 {
1147 /* This shouldn't be used for two flexible-precision inputs. */
1152 else
1154 }
1156 /* The storage used by FIXED_WIDE_INT (N). */
1159 {
1169 /* The standard generic_wide_int storage methods. */
1179 };
1181 namespace wi
1182 {
1185 {
1192 };
1193 }
1198 /* Initialize the storage from integer X, in precision N. */
1202 {
1203 /* Check for type compatibility. We don't want to initialize a
1204 fixed-width integer from something like a wide_int. */
1207 }
1212 {
1214 }
1219 {
1221 }
1226 {
1228 }
1233 {
1235 }
1240 {
1242 /* There are no excess bits in val[len - 1]. */
1244 }
1246 /* Treat X as having signedness SGN and convert it to an N-bit number. */
1250 {
1255 }
1257 /* Create a FIXED_WIDE_INT (N) from the explicit block encoding given by
1258 VAL and LEN. NEED_CANON_P is true if the encoding may have redundant
1259 trailing blocks. */
1265 {
1270 }
1277 {
1279 }
1281 /* A reference to one element of a trailing_wide_ints structure. */
1282 class trailing_wide_int_storage
1283 {
1285 /* The precision of the integer, which is a fixed property of the
1286 parent trailing_wide_ints. */
1289 /* A pointer to the length field. */
1292 /* A pointer to the HWI array. There are enough elements to hold all
1293 values of precision M_PRECISION. */
1299 /* The standard generic_wide_int storage methods. */
1308 };
1312 /* trailing_wide_int behaves like a wide_int. */
1313 namespace wi
1314 {
1318 }
1320 /* An array of N wide_int-like objects that can be put at the end of
1321 a variable-sized structure. Use extra_size to calculate how many
1322 bytes beyond the sizeof need to be allocated. Use set_precision
1323 to initialize the structure. */
1326 {
1328 /* The shared precision of each number. */
1331 /* The shared maximum length of each number. */
1334 /* The current length of each number. */
1337 /* The variable-length part of the structure, which always contains
1338 at least one HWI. Element I starts at index I * M_MAX_LEN. */
1345 };
1351 {
1352 }
1356 {
1358 }
1362 {
1364 }
1368 {
1370 }
1374 {
1376 }
1380 {
1385 }
1390 {
1394 }
1396 /* Initialize the structure and record that all elements have precision
1397 PRECISION. */
1401 {
1405 }
1407 /* Return a reference to element INDEX. */
1409 inline trailing_wide_int
1411 {
1414 }
1416 /* Return how many extra bytes need to be added to the end of the structure
1417 in order to handle N wide_ints of precision PRECISION. */
1421 {
1425 }
1427 /* This macro is used in structures that end with a trailing_wide_ints field
1428 called FIELD. It declares get_NAME() and set_NAME() methods to access
1429 element I of FIELD. */
1430 #define TRAILING_WIDE_INT_ACCESSOR(NAME, FIELD, I) \
1431 trailing_wide_int get_##NAME () { return FIELD[I]; } \
1432 template <typename T> void set_##NAME (const T &x) { FIELD[I] = x; }
1434 namespace wi
1435 {
1436 /* Implementation of int_traits for primitive integer types like "int". */
1438 struct primitive_int_traits
1439 {
1445 };
1446 }
1451 {
1453 }
1459 {
1465 }
1467 /* Allow primitive C types to be used in wi:: routines. */
1468 namespace wi
1469 {
1494 #if defined HAVE_LONG_LONG
1502 #endif
1503 }
1505 namespace wi
1506 {
1507 /* Stores HWI-sized integer VAL, treating it as having signedness SGN
1508 and precision PRECISION. */
1509 struct hwi_with_prec
1510 {
1512 HOST_WIDE_INT val;
1514 signop sgn;
1515 };
1524 }
1527 signop s)
1529 {
1532 else
1534 }
1536 /* Return a signed integer that has value VAL and precision PRECISION. */
1539 {
1541 }
1543 /* Return an unsigned integer that has value VAL and precision PRECISION. */
1546 {
1548 }
1550 /* Return a wide int of -1 with precision PRECISION. */
1553 {
1555 }
1557 /* Return a wide int of 0 with precision PRECISION. */
1560 {
1562 }
1564 /* Return a wide int of 1 with precision PRECISION. */
1567 {
1569 }
1571 /* Return a wide int of 2 with precision PRECISION. */
1574 {
1576 }
1578 namespace wi
1579 {
1582 {
1584 /* hwi_with_prec has an explicitly-given precision, rather than the
1585 precision of HOST_WIDE_INT. */
1591 };
1592 }
1596 {
1598 }
1604 {
1611 }
1613 /* Private functions for handling large cases out of line. They take
1614 individual length and array parameters because that is cheaper for
1615 the inline caller than constructing an object on the stack and
1616 passing a reference to it. (Although many callers use wide_int_refs,
1617 we generally want those to be removed by SRA.) */
1618 namespace wi
1619 {
1674 }
1676 /* Return the number of bits that integer X can hold. */
1680 {
1682 }
1684 /* Return the number of bits that the result of a binary operation can
1685 hold when the input operands are X and Y. */
1689 {
1692 }
1694 /* Copy the contents of Y to X, but keeping X's current precision. */
1698 {
1703 do
1707 }
1709 /* Return true if X fits in a HOST_WIDE_INT with no loss of precision. */
1713 {
1716 }
1718 /* Return true if X fits in an unsigned HOST_WIDE_INT with no loss of
1719 precision. */
1723 {
1730 }
1732 /* Return true if X is negative based on the interpretation of SGN.
1733 For UNSIGNED, this is always false. */
1737 {
1742 }
1744 /* Return -1 if the top bit of X is set and 0 if the top bit is clear. */
1746 inline HOST_WIDE_INT
1748 {
1751 }
1753 /* Return true if X == Y. X and Y must be binary-compatible. */
1757 {
1762 {
1763 /* This case reduces to array equality. */
1767 do
1772 }
1774 {
1775 /* XI is only equal to YI if it too has a single HWI. */
1778 /* Excess bits in xi.val[0] will be signs or zeros, so comparisons
1779 with 0 are simple. */
1782 /* Otherwise flush out any excess bits first. */
1788 }
1790 }
1792 /* Return true if X != Y. X and Y must be binary-compatible. */
1796 {
1798 }
1800 /* Return true if X < Y when both are treated as signed values. */
1804 {
1808 /* We optimize x < y, where y is 64 or fewer bits. */
1810 {
1811 /* Make lts_p (x, 0) as efficient as wi::neg_p (x). */
1814 /* If x fits directly into a shwi, we can compare directly. */
1817 /* If x doesn't fit and is negative, then it must be more
1818 negative than any value in y, and hence smaller than y. */
1821 /* If x is positive, then it must be larger than any value in y,
1822 and hence greater than y. */
1824 }
1825 /* Optimize the opposite case, if it can be detected at compile time. */
1827 /* If YI is negative it is lower than the least HWI.
1828 If YI is positive it is greater than the greatest HWI. */
1831 }
1833 /* Return true if X < Y when both are treated as unsigned values. */
1837 {
1841 /* Optimize comparisons with constants. */
1846 /* Optimize the case of two HWIs. The HWIs are implicitly sign-extended
1847 for precisions greater than HOST_BITS_WIDE_INT, but sign-extending both
1848 values does not change the result. */
1850 {
1854 }
1856 }
1858 /* Return true if X < Y. Signedness of X and Y is indicated by SGN. */
1862 {
1865 else
1867 }
1869 /* Return true if X <= Y when both are treated as signed values. */
1873 {
1875 }
1877 /* Return true if X <= Y when both are treated as unsigned values. */
1881 {
1883 }
1885 /* Return true if X <= Y. Signedness of X and Y is indicated by SGN. */
1889 {
1892 else
1894 }
1896 /* Return true if X > Y when both are treated as signed values. */
1900 {
1902 }
1904 /* Return true if X > Y when both are treated as unsigned values. */
1908 {
1910 }
1912 /* Return true if X > Y. Signedness of X and Y is indicated by SGN. */
1916 {
1919 else
1921 }
1923 /* Return true if X >= Y when both are treated as signed values. */
1927 {
1929 }
1931 /* Return true if X >= Y when both are treated as unsigned values. */
1935 {
1937 }
1939 /* Return true if X >= Y. Signedness of X and Y is indicated by SGN. */
1943 {
1946 else
1948 }
1950 /* Return -1 if X < Y, 0 if X == Y and 1 if X > Y. Treat both X and Y
1951 as signed values. */
1955 {
1960 {
1961 /* Special case for comparisons with 0. */
1964 /* If x fits into a signed HWI, we can compare directly. */
1966 {
1970 }
1971 /* If x doesn't fit and is negative, then it must be more
1972 negative than any signed HWI, and hence smaller than y. */
1975 /* If x is positive, then it must be larger than any signed HWI,
1976 and hence greater than y. */
1978 }
1979 /* Optimize the opposite case, if it can be detected at compile time. */
1981 /* If YI is negative it is lower than the least HWI.
1982 If YI is positive it is greater than the greatest HWI. */
1985 }
1987 /* Return -1 if X < Y, 0 if X == Y and 1 if X > Y. Treat both X and Y
1988 as unsigned values. */
1992 {
1996 /* Optimize comparisons with constants. */
1998 {
1999 /* If XI doesn't fit in a HWI then it must be larger than YI. */
2002 /* Otherwise compare directly. */
2006 }
2008 {
2009 /* If YI doesn't fit in a HWI then it must be larger than XI. */
2012 /* Otherwise compare directly. */
2016 }
2017 /* Optimize the case of two HWIs. The HWIs are implicitly sign-extended
2018 for precisions greater than HOST_BITS_WIDE_INT, but sign-extending both
2019 values does not change the result. */
2021 {
2025 }
2027 }
2029 /* Return -1 if X < Y, 0 if X == Y and 1 if X > Y. Signedness of
2030 X and Y indicated by SGN. */
2034 {
2037 else
2039 }
2041 /* Return ~x. */
2045 {
2052 }
2054 /* Return -x. */
2058 {
2060 }
2062 /* Return -x. Indicate in *OVERFLOW if X is the minimum signed value. */
2066 {
2069 }
2071 /* Return the absolute value of x. */
2075 {
2077 }
2079 /* Return the result of sign-extending the low OFFSET bits of X. */
2083 {
2089 {
2092 }
2093 else
2096 }
2098 /* Return the result of zero-extending the low OFFSET bits of X. */
2102 {
2107 /* This is not just an optimization, it is actually required to
2108 maintain canonization. */
2110 {
2113 }
2115 /* In these cases we know that at least the top bit will be clear,
2116 so no sign extension is necessary. */
2118 {
2121 }
2122 else
2125 }
2127 /* Return the result of extending the low OFFSET bits of X according to
2128 signedness SGN. */
2132 {
2134 }
2136 /* Return an integer that represents X | (1 << bit). */
2140 {
2145 {
2148 }
2149 else
2152 }
2154 /* Return the mininum of X and Y, treating them both as having
2155 signedness SGN. */
2159 {
2164 else
2167 }
2169 /* Return the minimum of X and Y, treating both as signed values. */
2173 {
2175 }
2177 /* Return the minimum of X and Y, treating both as unsigned values. */
2181 {
2183 }
2185 /* Return the maxinum of X and Y, treating them both as having
2186 signedness SGN. */
2190 {
2195 else
2198 }
2200 /* Return the maximum of X and Y, treating both as signed values. */
2204 {
2206 }
2208 /* Return the maximum of X and Y, treating both as unsigned values. */
2212 {
2214 }
2216 /* Return X & Y. */
2220 {
2227 {
2230 }
2231 else
2235 }
2237 /* Return X & ~Y. */
2241 {
2248 {
2251 }
2252 else
2256 }
2258 /* Return X | Y. */
2262 {
2269 {
2272 }
2273 else
2277 }
2279 /* Return X | ~Y. */
2283 {
2290 {
2293 }
2294 else
2298 }
2300 /* Return X ^ Y. */
2304 {
2311 {
2314 }
2315 else
2319 }
2321 /* Return X + Y. */
2325 {
2331 {
2334 }
2335 /* If the precision is known at compile time to be greater than
2336 HOST_BITS_PER_WIDE_INT, we can optimize the single-HWI case
2337 knowing that (a) all bits in those HWIs are significant and
2338 (b) the result has room for at least two HWIs. This provides
2339 a fast path for things like offset_int and widest_int.
2341 The STATIC_CONSTANT_P test prevents this path from being
2342 used for wide_ints. wide_ints with precisions greater than
2343 HOST_BITS_PER_WIDE_INT are relatively rare and there's not much
2344 point handling them inline. */
2347 {
2355 }
2356 else
2361 }
2363 /* Return X + Y. Treat X and Y as having the signednes given by SGN
2364 and indicate in *OVERFLOW whether the operation overflowed. */
2368 {
2374 {
2381 else
2386 }
2387 else
2392 }
2394 /* Return X - Y. */
2398 {
2404 {
2407 }
2408 /* If the precision is known at compile time to be greater than
2409 HOST_BITS_PER_WIDE_INT, we can optimize the single-HWI case
2410 knowing that (a) all bits in those HWIs are significant and
2411 (b) the result has room for at least two HWIs. This provides
2412 a fast path for things like offset_int and widest_int.
2414 The STATIC_CONSTANT_P test prevents this path from being
2415 used for wide_ints. wide_ints with precisions greater than
2416 HOST_BITS_PER_WIDE_INT are relatively rare and there's not much
2417 point handling them inline. */
2420 {
2428 }
2429 else
2434 }
2436 /* Return X - Y. Treat X and Y as having the signednes given by SGN
2437 and indicate in *OVERFLOW whether the operation overflowed. */
2441 {
2447 {
2453 else
2458 }
2459 else
2464 }
2466 /* Return X * Y. */
2470 {
2476 {
2479 }
2480 else
2484 }
2486 /* Return X * Y. Treat X and Y as having the signednes given by SGN
2487 and indicate in *OVERFLOW whether the operation overflowed. */
2491 {
2500 }
2502 /* Return X * Y, treating both X and Y as signed values. Indicate in
2503 *OVERFLOW whether the operation overflowed. */
2507 {
2509 }
2511 /* Return X * Y, treating both X and Y as unsigned values. Indicate in
2512 *OVERFLOW whether the operation overflowed. */
2516 {
2518 }
2520 /* Perform a widening multiplication of X and Y, extending the values
2521 according to SGN, and return the high part of the result. */
2525 {
2534 }
2536 /* Return X / Y, rouding towards 0. Treat X and Y as having the
2537 signedness given by SGN. Indicate in *OVERFLOW if the result
2538 overflows. */
2542 {
2549 precision,
2553 }
2555 /* Return X / Y, rouding towards 0. Treat X and Y as signed values. */
2559 {
2561 }
2563 /* Return X / Y, rouding towards 0. Treat X and Y as unsigned values. */
2567 {
2569 }
2571 /* Return X / Y, rouding towards -inf. Treat X and Y as having the
2572 signedness given by SGN. Indicate in *OVERFLOW if the result
2573 overflows. */
2577 {
2589 overflow));
2594 }
2596 /* Return X / Y, rouding towards -inf. Treat X and Y as signed values. */
2600 {
2602 }
2604 /* Return X / Y, rouding towards -inf. Treat X and Y as unsigned values. */
2605 /* ??? Why do we have both this and udiv_trunc. Aren't they the same? */
2609 {
2611 }
2613 /* Return X / Y, rouding towards +inf. Treat X and Y as having the
2614 signedness given by SGN. Indicate in *OVERFLOW if the result
2615 overflows. */
2619 {
2631 overflow));
2636 }
2638 /* Return X / Y, rouding towards nearest with ties away from zero.
2639 Treat X and Y as having the signedness given by SGN. Indicate
2640 in *OVERFLOW if the result overflows. */
2644 {
2656 overflow));
2660 {
2662 {
2665 {
2668 else
2670 }
2671 }
2672 else
2673 {
2676 }
2677 }
2679 }
2681 /* Return X / Y, rouding towards 0. Treat X and Y as having the
2682 signedness given by SGN. Store the remainder in *REMAINDER_PTR. */
2687 {
2703 }
2705 /* Compute the greatest common divisor of two numbers A and B using
2706 Euclid's algorithm. */
2710 {
2717 {
2721 }
2724 }
2726 /* Compute X / Y, rouding towards 0, and return the remainder.
2727 Treat X and Y as having the signedness given by SGN. Indicate
2728 in *OVERFLOW if the division overflows. */
2732 {
2745 }
2747 /* Compute X / Y, rouding towards 0, and return the remainder.
2748 Treat X and Y as signed values. */
2752 {
2754 }
2756 /* Compute X / Y, rouding towards 0, and return the remainder.
2757 Treat X and Y as unsigned values. */
2761 {
2763 }
2765 /* Compute X / Y, rouding towards -inf, and return the remainder.
2766 Treat X and Y as having the signedness given by SGN. Indicate
2767 in *OVERFLOW if the division overflows. */
2771 {
2783 overflow));
2789 }
2791 /* Compute X / Y, rouding towards -inf, and return the remainder.
2792 Treat X and Y as unsigned values. */
2793 /* ??? Why do we have both this and umod_trunc. Aren't they the same? */
2797 {
2799 }
2801 /* Compute X / Y, rouding towards +inf, and return the remainder.
2802 Treat X and Y as having the signedness given by SGN. Indicate
2803 in *OVERFLOW if the division overflows. */
2807 {
2819 overflow));
2825 }
2827 /* Compute X / Y, rouding towards nearest with ties away from zero,
2828 and return the remainder. Treat X and Y as having the signedness
2829 given by SGN. Indicate in *OVERFLOW if the division overflows. */
2833 {
2845 overflow));
2849 {
2851 {
2854 {
2857 else
2859 }
2860 }
2861 else
2862 {
2865 }
2866 }
2868 }
2870 /* Return true if X is a multiple of Y. Treat X and Y as having the
2871 signedness given by SGN. */
2875 {
2877 }
2879 /* Return true if X is a multiple of Y, storing X / Y in *RES if so.
2880 Treat X and Y as having the signedness given by SGN. */
2885 {
2890 {
2893 }
2895 }
2897 /* Return X << Y. Return 0 if Y is greater than or equal to
2898 the precision of X. */
2902 {
2907 /* Handle the simple cases quickly. */
2909 {
2912 }
2913 else
2914 {
2916 /* For fixed-precision integers like offset_int and widest_int,
2917 handle the case where the shift value is constant and the
2918 result is a single nonnegative HWI (meaning that we don't
2919 need to worry about val[1]). This is particularly common
2920 for converting a byte count to a bit count.
2922 For variable-precision integers like wide_int, handle HWI
2923 and sub-HWI integers inline. */
2930 {
2933 }
2934 else
2937 }
2939 }
2941 /* Return X >> Y, using a logical shift. Return 0 if Y is greater than
2942 or equal to the precision of X. */
2946 {
2948 /* Do things in the precision of the input rather than the output,
2949 since the result can be no larger than that. */
2952 /* Handle the simple cases quickly. */
2954 {
2957 }
2958 else
2959 {
2961 /* For fixed-precision integers like offset_int and widest_int,
2962 handle the case where the shift value is constant and the
2963 shifted value is a single nonnegative HWI (meaning that all
2964 bits above the HWI are zero). This is particularly common
2965 for converting a bit count to a byte count.
2967 For variable-precision integers like wide_int, handle HWI
2968 and sub-HWI integers inline. */
2974 {
2977 }
2978 else
2981 }
2983 }
2985 /* Return X >> Y, using an arithmetic shift. Return a sign mask if
2986 Y is greater than or equal to the precision of X. */
2990 {
2992 /* Do things in the precision of the input rather than the output,
2993 since the result can be no larger than that. */
2996 /* Handle the simple cases quickly. */
2998 {
3001 }
3002 else
3003 {
3006 {
3009 }
3010 else
3013 }
3015 }
3017 /* Return X >> Y, using an arithmetic shift if SGN is SIGNED and a
3018 logical shift otherwise. */
3022 {
3025 else
3027 }
3029 /* Return the result of rotating the low WIDTH bits of X left by Y
3030 bits and zero-extending the result. Use a full-width rotate if
3031 WIDTH is zero. */
3035 {
3045 }
3047 /* Return the result of rotating the low WIDTH bits of X right by Y
3048 bits and zero-extending the result. Use a full-width rotate if
3049 WIDTH is zero. */
3053 {
3063 }
3065 /* Return 0 if the number of 1s in X is even and 1 if the number of 1s
3066 is odd. */
3069 {
3071 }
3073 /* Extract WIDTH bits from X, starting at BITPOS. */
3077 {
3083 /* Handle this rare case after the above, so that we assert about
3084 bogus BITPOS values. */
3093 {
3096 }
3098 }
3100 /* Return the minimum precision needed to store X with sign SGN. */
3104 {
3107 else
3109 }
3111 #define SIGNED_BINARY_PREDICATE(OP, F) \
3112 template <typename T1, typename T2> \
3113 inline WI_SIGNED_BINARY_PREDICATE_RESULT (T1, T2) \
3114 OP (const T1 &x, const T2 &y) \
3115 { \
3116 return wi::F (x, y); \
3117 }
3124 #undef SIGNED_BINARY_PREDICATE
3129 {
3131 }
3136 {
3138 }
3141 void
3143 {
3144 }
3147 void
3149 {
3150 }
3153 void
3155 {
3156 }
3159 void
3161 {
3162 }
3165 void
3167 {
3168 }
3171 void
3173 {
3174 }
3176 namespace wi
3177 {
3178 /* Used for overloaded functions in which the only other acceptable
3179 scalar type is a pointer. It stops a plain 0 from being treated
3180 as a null pointer. */
3191 /* FIXME: this is target dependent, so should be elsewhere.
3192 It also seems to assume that CHAR_BIT == BITS_PER_UNIT. */
3195 #ifndef GENERATOR_FILE
3197 #endif
3219 }
3221 /* Return a PRECISION-bit integer in which the low WIDTH bits are set
3222 and the other bits are clear, or the inverse if NEGATE_P. */
3223 inline wide_int
3225 {
3229 }
3231 /* Return a PRECISION-bit integer in which the low START bits are clear,
3232 the next WIDTH bits are set, and the other bits are clear,
3233 or the inverse if NEGATE_P. */
3234 inline wide_int
3237 {
3240 precision));
3242 }
3244 /* Return a PRECISION-bit integer in which bit BIT is set and all the
3245 others are clear. */
3246 inline wide_int
3248 {
3250 }
3252 /* Return an integer of type T in which the low WIDTH bits are set
3253 and the other bits are clear, or the inverse if NEGATE_P. */
3255 inline T
3257 {
3259 T result;
3263 }
3265 /* Return an integer of type T in which the low START bits are clear,
3266 the next WIDTH bits are set, and the other bits are clear, or the
3267 inverse if NEGATE_P. */
3269 inline T
3271 {
3273 T result;
3275 negate_p,
3278 }
3280 /* Return an integer of type T in which bit BIT is set and all the
3281 others are clear. */
3283 inline T
3285 {
3287 }