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freebsd/contrib/gcc/tree-chrec.c
2007-05-19 01:19:51 +00:00

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/* Chains of recurrences.
Copyright (C) 2003, 2004, 2005, 2006 Free Software Foundation, Inc.
Contributed by Sebastian Pop <pop@cri.ensmp.fr>
This file is part of GCC.
GCC is free software; you can redistribute it and/or modify it under
the terms of the GNU General Public License as published by the Free
Software Foundation; either version 2, or (at your option) any later
version.
GCC is distributed in the hope that it will be useful, but WITHOUT ANY
WARRANTY; without even the implied warranty of MERCHANTABILITY or
FITNESS FOR A PARTICULAR PURPOSE. See the GNU General Public License
for more details.
You should have received a copy of the GNU General Public License
along with GCC; see the file COPYING. If not, write to the Free
Software Foundation, 51 Franklin Street, Fifth Floor, Boston, MA
02110-1301, USA. */
/* This file implements operations on chains of recurrences. Chains
of recurrences are used for modeling evolution functions of scalar
variables.
*/
#include "config.h"
#include "system.h"
#include "coretypes.h"
#include "tm.h"
#include "ggc.h"
#include "tree.h"
#include "real.h"
#include "diagnostic.h"
#include "cfgloop.h"
#include "tree-flow.h"
#include "tree-chrec.h"
#include "tree-pass.h"
#include "params.h"
#include "tree-scalar-evolution.h"
/* Extended folder for chrecs. */
/* Determines whether CST is not a constant evolution. */
static inline bool
is_not_constant_evolution (tree cst)
{
return (TREE_CODE (cst) == POLYNOMIAL_CHREC);
}
/* Fold CODE for a polynomial function and a constant. */
static inline tree
chrec_fold_poly_cst (enum tree_code code,
tree type,
tree poly,
tree cst)
{
gcc_assert (poly);
gcc_assert (cst);
gcc_assert (TREE_CODE (poly) == POLYNOMIAL_CHREC);
gcc_assert (!is_not_constant_evolution (cst));
gcc_assert (type == chrec_type (poly));
switch (code)
{
case PLUS_EXPR:
return build_polynomial_chrec
(CHREC_VARIABLE (poly),
chrec_fold_plus (type, CHREC_LEFT (poly), cst),
CHREC_RIGHT (poly));
case MINUS_EXPR:
return build_polynomial_chrec
(CHREC_VARIABLE (poly),
chrec_fold_minus (type, CHREC_LEFT (poly), cst),
CHREC_RIGHT (poly));
case MULT_EXPR:
return build_polynomial_chrec
(CHREC_VARIABLE (poly),
chrec_fold_multiply (type, CHREC_LEFT (poly), cst),
chrec_fold_multiply (type, CHREC_RIGHT (poly), cst));
default:
return chrec_dont_know;
}
}
/* Fold the addition of two polynomial functions. */
static inline tree
chrec_fold_plus_poly_poly (enum tree_code code,
tree type,
tree poly0,
tree poly1)
{
tree left, right;
gcc_assert (poly0);
gcc_assert (poly1);
gcc_assert (TREE_CODE (poly0) == POLYNOMIAL_CHREC);
gcc_assert (TREE_CODE (poly1) == POLYNOMIAL_CHREC);
gcc_assert (chrec_type (poly0) == chrec_type (poly1));
gcc_assert (type == chrec_type (poly0));
/*
{a, +, b}_1 + {c, +, d}_2 -> {{a, +, b}_1 + c, +, d}_2,
{a, +, b}_2 + {c, +, d}_1 -> {{c, +, d}_1 + a, +, b}_2,
{a, +, b}_x + {c, +, d}_x -> {a+c, +, b+d}_x. */
if (CHREC_VARIABLE (poly0) < CHREC_VARIABLE (poly1))
{
if (code == PLUS_EXPR)
return build_polynomial_chrec
(CHREC_VARIABLE (poly1),
chrec_fold_plus (type, poly0, CHREC_LEFT (poly1)),
CHREC_RIGHT (poly1));
else
return build_polynomial_chrec
(CHREC_VARIABLE (poly1),
chrec_fold_minus (type, poly0, CHREC_LEFT (poly1)),
chrec_fold_multiply (type, CHREC_RIGHT (poly1),
SCALAR_FLOAT_TYPE_P (type)
? build_real (type, dconstm1)
: build_int_cst_type (type, -1)));
}
if (CHREC_VARIABLE (poly0) > CHREC_VARIABLE (poly1))
{
if (code == PLUS_EXPR)
return build_polynomial_chrec
(CHREC_VARIABLE (poly0),
chrec_fold_plus (type, CHREC_LEFT (poly0), poly1),
CHREC_RIGHT (poly0));
else
return build_polynomial_chrec
(CHREC_VARIABLE (poly0),
chrec_fold_minus (type, CHREC_LEFT (poly0), poly1),
CHREC_RIGHT (poly0));
}
if (code == PLUS_EXPR)
{
left = chrec_fold_plus
(type, CHREC_LEFT (poly0), CHREC_LEFT (poly1));
right = chrec_fold_plus
(type, CHREC_RIGHT (poly0), CHREC_RIGHT (poly1));
}
else
{
left = chrec_fold_minus
(type, CHREC_LEFT (poly0), CHREC_LEFT (poly1));
right = chrec_fold_minus
(type, CHREC_RIGHT (poly0), CHREC_RIGHT (poly1));
}
if (chrec_zerop (right))
return left;
else
return build_polynomial_chrec
(CHREC_VARIABLE (poly0), left, right);
}
/* Fold the multiplication of two polynomial functions. */
static inline tree
chrec_fold_multiply_poly_poly (tree type,
tree poly0,
tree poly1)
{
tree t0, t1, t2;
int var;
gcc_assert (poly0);
gcc_assert (poly1);
gcc_assert (TREE_CODE (poly0) == POLYNOMIAL_CHREC);
gcc_assert (TREE_CODE (poly1) == POLYNOMIAL_CHREC);
gcc_assert (chrec_type (poly0) == chrec_type (poly1));
gcc_assert (type == chrec_type (poly0));
/* {a, +, b}_1 * {c, +, d}_2 -> {c*{a, +, b}_1, +, d}_2,
{a, +, b}_2 * {c, +, d}_1 -> {a*{c, +, d}_1, +, b}_2,
{a, +, b}_x * {c, +, d}_x -> {a*c, +, a*d + b*c + b*d, +, 2*b*d}_x. */
if (CHREC_VARIABLE (poly0) < CHREC_VARIABLE (poly1))
/* poly0 is a constant wrt. poly1. */
return build_polynomial_chrec
(CHREC_VARIABLE (poly1),
chrec_fold_multiply (type, CHREC_LEFT (poly1), poly0),
CHREC_RIGHT (poly1));
if (CHREC_VARIABLE (poly1) < CHREC_VARIABLE (poly0))
/* poly1 is a constant wrt. poly0. */
return build_polynomial_chrec
(CHREC_VARIABLE (poly0),
chrec_fold_multiply (type, CHREC_LEFT (poly0), poly1),
CHREC_RIGHT (poly0));
/* poly0 and poly1 are two polynomials in the same variable,
{a, +, b}_x * {c, +, d}_x -> {a*c, +, a*d + b*c + b*d, +, 2*b*d}_x. */
/* "a*c". */
t0 = chrec_fold_multiply (type, CHREC_LEFT (poly0), CHREC_LEFT (poly1));
/* "a*d + b*c + b*d". */
t1 = chrec_fold_multiply (type, CHREC_LEFT (poly0), CHREC_RIGHT (poly1));
t1 = chrec_fold_plus (type, t1, chrec_fold_multiply (type,
CHREC_RIGHT (poly0),
CHREC_LEFT (poly1)));
t1 = chrec_fold_plus (type, t1, chrec_fold_multiply (type,
CHREC_RIGHT (poly0),
CHREC_RIGHT (poly1)));
/* "2*b*d". */
t2 = chrec_fold_multiply (type, CHREC_RIGHT (poly0), CHREC_RIGHT (poly1));
t2 = chrec_fold_multiply (type, SCALAR_FLOAT_TYPE_P (type)
? build_real (type, dconst2)
: build_int_cst (type, 2), t2);
var = CHREC_VARIABLE (poly0);
return build_polynomial_chrec (var, t0,
build_polynomial_chrec (var, t1, t2));
}
/* When the operands are automatically_generated_chrec_p, the fold has
to respect the semantics of the operands. */
static inline tree
chrec_fold_automatically_generated_operands (tree op0,
tree op1)
{
if (op0 == chrec_dont_know
|| op1 == chrec_dont_know)
return chrec_dont_know;
if (op0 == chrec_known
|| op1 == chrec_known)
return chrec_known;
if (op0 == chrec_not_analyzed_yet
|| op1 == chrec_not_analyzed_yet)
return chrec_not_analyzed_yet;
/* The default case produces a safe result. */
return chrec_dont_know;
}
/* Fold the addition of two chrecs. */
static tree
chrec_fold_plus_1 (enum tree_code code, tree type,
tree op0, tree op1)
{
if (automatically_generated_chrec_p (op0)
|| automatically_generated_chrec_p (op1))
return chrec_fold_automatically_generated_operands (op0, op1);
switch (TREE_CODE (op0))
{
case POLYNOMIAL_CHREC:
switch (TREE_CODE (op1))
{
case POLYNOMIAL_CHREC:
return chrec_fold_plus_poly_poly (code, type, op0, op1);
default:
if (code == PLUS_EXPR)
return build_polynomial_chrec
(CHREC_VARIABLE (op0),
chrec_fold_plus (type, CHREC_LEFT (op0), op1),
CHREC_RIGHT (op0));
else
return build_polynomial_chrec
(CHREC_VARIABLE (op0),
chrec_fold_minus (type, CHREC_LEFT (op0), op1),
CHREC_RIGHT (op0));
}
default:
switch (TREE_CODE (op1))
{
case POLYNOMIAL_CHREC:
if (code == PLUS_EXPR)
return build_polynomial_chrec
(CHREC_VARIABLE (op1),
chrec_fold_plus (type, op0, CHREC_LEFT (op1)),
CHREC_RIGHT (op1));
else
return build_polynomial_chrec
(CHREC_VARIABLE (op1),
chrec_fold_minus (type, op0, CHREC_LEFT (op1)),
chrec_fold_multiply (type, CHREC_RIGHT (op1),
SCALAR_FLOAT_TYPE_P (type)
? build_real (type, dconstm1)
: build_int_cst_type (type, -1)));
default:
{
int size = 0;
if ((tree_contains_chrecs (op0, &size)
|| tree_contains_chrecs (op1, &size))
&& size < PARAM_VALUE (PARAM_SCEV_MAX_EXPR_SIZE))
return build2 (code, type, op0, op1);
else if (size < PARAM_VALUE (PARAM_SCEV_MAX_EXPR_SIZE))
return fold_build2 (code, type,
fold_convert (type, op0),
fold_convert (type, op1));
else
return chrec_dont_know;
}
}
}
}
/* Fold the addition of two chrecs. */
tree
chrec_fold_plus (tree type,
tree op0,
tree op1)
{
if (automatically_generated_chrec_p (op0)
|| automatically_generated_chrec_p (op1))
return chrec_fold_automatically_generated_operands (op0, op1);
if (integer_zerop (op0))
return op1;
if (integer_zerop (op1))
return op0;
return chrec_fold_plus_1 (PLUS_EXPR, type, op0, op1);
}
/* Fold the subtraction of two chrecs. */
tree
chrec_fold_minus (tree type,
tree op0,
tree op1)
{
if (automatically_generated_chrec_p (op0)
|| automatically_generated_chrec_p (op1))
return chrec_fold_automatically_generated_operands (op0, op1);
if (integer_zerop (op1))
return op0;
return chrec_fold_plus_1 (MINUS_EXPR, type, op0, op1);
}
/* Fold the multiplication of two chrecs. */
tree
chrec_fold_multiply (tree type,
tree op0,
tree op1)
{
if (automatically_generated_chrec_p (op0)
|| automatically_generated_chrec_p (op1))
return chrec_fold_automatically_generated_operands (op0, op1);
switch (TREE_CODE (op0))
{
case POLYNOMIAL_CHREC:
switch (TREE_CODE (op1))
{
case POLYNOMIAL_CHREC:
return chrec_fold_multiply_poly_poly (type, op0, op1);
default:
if (integer_onep (op1))
return op0;
if (integer_zerop (op1))
return build_int_cst (type, 0);
return build_polynomial_chrec
(CHREC_VARIABLE (op0),
chrec_fold_multiply (type, CHREC_LEFT (op0), op1),
chrec_fold_multiply (type, CHREC_RIGHT (op0), op1));
}
default:
if (integer_onep (op0))
return op1;
if (integer_zerop (op0))
return build_int_cst (type, 0);
switch (TREE_CODE (op1))
{
case POLYNOMIAL_CHREC:
return build_polynomial_chrec
(CHREC_VARIABLE (op1),
chrec_fold_multiply (type, CHREC_LEFT (op1), op0),
chrec_fold_multiply (type, CHREC_RIGHT (op1), op0));
default:
if (integer_onep (op1))
return op0;
if (integer_zerop (op1))
return build_int_cst (type, 0);
return fold_build2 (MULT_EXPR, type, op0, op1);
}
}
}
/* Operations. */
/* Evaluate the binomial coefficient. Return NULL_TREE if the intermediate
calculation overflows, otherwise return C(n,k) with type TYPE. */
static tree
tree_fold_binomial (tree type, tree n, unsigned int k)
{
unsigned HOST_WIDE_INT lidx, lnum, ldenom, lres, ldum;
HOST_WIDE_INT hidx, hnum, hdenom, hres, hdum;
unsigned int i;
tree res;
/* Handle the most frequent cases. */
if (k == 0)
return build_int_cst (type, 1);
if (k == 1)
return fold_convert (type, n);
/* Check that k <= n. */
if (TREE_INT_CST_HIGH (n) == 0
&& TREE_INT_CST_LOW (n) < k)
return NULL_TREE;
/* Numerator = n. */
lnum = TREE_INT_CST_LOW (n);
hnum = TREE_INT_CST_HIGH (n);
/* Denominator = 2. */
ldenom = 2;
hdenom = 0;
/* Index = Numerator-1. */
if (lnum == 0)
{
hidx = hnum - 1;
lidx = ~ (unsigned HOST_WIDE_INT) 0;
}
else
{
hidx = hnum;
lidx = lnum - 1;
}
/* Numerator = Numerator*Index = n*(n-1). */
if (mul_double (lnum, hnum, lidx, hidx, &lnum, &hnum))
return NULL_TREE;
for (i = 3; i <= k; i++)
{
/* Index--. */
if (lidx == 0)
{
hidx--;
lidx = ~ (unsigned HOST_WIDE_INT) 0;
}
else
lidx--;
/* Numerator *= Index. */
if (mul_double (lnum, hnum, lidx, hidx, &lnum, &hnum))
return NULL_TREE;
/* Denominator *= i. */
mul_double (ldenom, hdenom, i, 0, &ldenom, &hdenom);
}
/* Result = Numerator / Denominator. */
div_and_round_double (EXACT_DIV_EXPR, 1, lnum, hnum, ldenom, hdenom,
&lres, &hres, &ldum, &hdum);
res = build_int_cst_wide (type, lres, hres);
return int_fits_type_p (res, type) ? res : NULL_TREE;
}
/* Helper function. Use the Newton's interpolating formula for
evaluating the value of the evolution function. */
static tree
chrec_evaluate (unsigned var, tree chrec, tree n, unsigned int k)
{
tree arg0, arg1, binomial_n_k;
tree type = TREE_TYPE (chrec);
while (TREE_CODE (chrec) == POLYNOMIAL_CHREC
&& CHREC_VARIABLE (chrec) > var)
chrec = CHREC_LEFT (chrec);
if (TREE_CODE (chrec) == POLYNOMIAL_CHREC
&& CHREC_VARIABLE (chrec) == var)
{
arg0 = chrec_evaluate (var, CHREC_RIGHT (chrec), n, k + 1);
if (arg0 == chrec_dont_know)
return chrec_dont_know;
binomial_n_k = tree_fold_binomial (type, n, k);
if (!binomial_n_k)
return chrec_dont_know;
arg1 = fold_build2 (MULT_EXPR, type,
CHREC_LEFT (chrec), binomial_n_k);
return chrec_fold_plus (type, arg0, arg1);
}
binomial_n_k = tree_fold_binomial (type, n, k);
if (!binomial_n_k)
return chrec_dont_know;
return fold_build2 (MULT_EXPR, type, chrec, binomial_n_k);
}
/* Evaluates "CHREC (X)" when the varying variable is VAR.
Example: Given the following parameters,
var = 1
chrec = {3, +, 4}_1
x = 10
The result is given by the Newton's interpolating formula:
3 * \binom{10}{0} + 4 * \binom{10}{1}.
*/
tree
chrec_apply (unsigned var,
tree chrec,
tree x)
{
tree type = chrec_type (chrec);
tree res = chrec_dont_know;
if (automatically_generated_chrec_p (chrec)
|| automatically_generated_chrec_p (x)
/* When the symbols are defined in an outer loop, it is possible
to symbolically compute the apply, since the symbols are
constants with respect to the varying loop. */
|| chrec_contains_symbols_defined_in_loop (chrec, var))
return chrec_dont_know;
if (dump_file && (dump_flags & TDF_DETAILS))
fprintf (dump_file, "(chrec_apply \n");
if (TREE_CODE (x) == INTEGER_CST && SCALAR_FLOAT_TYPE_P (type))
x = build_real_from_int_cst (type, x);
if (evolution_function_is_affine_p (chrec))
{
/* "{a, +, b} (x)" -> "a + b*x". */
x = chrec_convert (type, x, NULL_TREE);
res = chrec_fold_multiply (type, CHREC_RIGHT (chrec), x);
if (!integer_zerop (CHREC_LEFT (chrec)))
res = chrec_fold_plus (type, CHREC_LEFT (chrec), res);
}
else if (TREE_CODE (chrec) != POLYNOMIAL_CHREC)
res = chrec;
else if (TREE_CODE (x) == INTEGER_CST
&& tree_int_cst_sgn (x) == 1)
/* testsuite/.../ssa-chrec-38.c. */
res = chrec_evaluate (var, chrec, x, 0);
else
res = chrec_dont_know;
if (dump_file && (dump_flags & TDF_DETAILS))
{
fprintf (dump_file, " (varying_loop = %d\n", var);
fprintf (dump_file, ")\n (chrec = ");
print_generic_expr (dump_file, chrec, 0);
fprintf (dump_file, ")\n (x = ");
print_generic_expr (dump_file, x, 0);
fprintf (dump_file, ")\n (res = ");
print_generic_expr (dump_file, res, 0);
fprintf (dump_file, "))\n");
}
return res;
}
/* Replaces the initial condition in CHREC with INIT_COND. */
tree
chrec_replace_initial_condition (tree chrec,
tree init_cond)
{
if (automatically_generated_chrec_p (chrec))
return chrec;
gcc_assert (chrec_type (chrec) == chrec_type (init_cond));
switch (TREE_CODE (chrec))
{
case POLYNOMIAL_CHREC:
return build_polynomial_chrec
(CHREC_VARIABLE (chrec),
chrec_replace_initial_condition (CHREC_LEFT (chrec), init_cond),
CHREC_RIGHT (chrec));
default:
return init_cond;
}
}
/* Returns the initial condition of a given CHREC. */
tree
initial_condition (tree chrec)
{
if (automatically_generated_chrec_p (chrec))
return chrec;
if (TREE_CODE (chrec) == POLYNOMIAL_CHREC)
return initial_condition (CHREC_LEFT (chrec));
else
return chrec;
}
/* Returns a univariate function that represents the evolution in
LOOP_NUM. Mask the evolution of any other loop. */
tree
hide_evolution_in_other_loops_than_loop (tree chrec,
unsigned loop_num)
{
if (automatically_generated_chrec_p (chrec))
return chrec;
switch (TREE_CODE (chrec))
{
case POLYNOMIAL_CHREC:
if (CHREC_VARIABLE (chrec) == loop_num)
return build_polynomial_chrec
(loop_num,
hide_evolution_in_other_loops_than_loop (CHREC_LEFT (chrec),
loop_num),
CHREC_RIGHT (chrec));
else if (CHREC_VARIABLE (chrec) < loop_num)
/* There is no evolution in this loop. */
return initial_condition (chrec);
else
return hide_evolution_in_other_loops_than_loop (CHREC_LEFT (chrec),
loop_num);
default:
return chrec;
}
}
/* Returns the evolution part of CHREC in LOOP_NUM when RIGHT is
true, otherwise returns the initial condition in LOOP_NUM. */
static tree
chrec_component_in_loop_num (tree chrec,
unsigned loop_num,
bool right)
{
tree component;
if (automatically_generated_chrec_p (chrec))
return chrec;
switch (TREE_CODE (chrec))
{
case POLYNOMIAL_CHREC:
if (CHREC_VARIABLE (chrec) == loop_num)
{
if (right)
component = CHREC_RIGHT (chrec);
else
component = CHREC_LEFT (chrec);
if (TREE_CODE (CHREC_LEFT (chrec)) != POLYNOMIAL_CHREC
|| CHREC_VARIABLE (CHREC_LEFT (chrec)) != CHREC_VARIABLE (chrec))
return component;
else
return build_polynomial_chrec
(loop_num,
chrec_component_in_loop_num (CHREC_LEFT (chrec),
loop_num,
right),
component);
}
else if (CHREC_VARIABLE (chrec) < loop_num)
/* There is no evolution part in this loop. */
return NULL_TREE;
else
return chrec_component_in_loop_num (CHREC_LEFT (chrec),
loop_num,
right);
default:
if (right)
return NULL_TREE;
else
return chrec;
}
}
/* Returns the evolution part in LOOP_NUM. Example: the call
evolution_part_in_loop_num ({{0, +, 1}_1, +, 2}_1, 1) returns
{1, +, 2}_1 */
tree
evolution_part_in_loop_num (tree chrec,
unsigned loop_num)
{
return chrec_component_in_loop_num (chrec, loop_num, true);
}
/* Returns the initial condition in LOOP_NUM. Example: the call
initial_condition_in_loop_num ({{0, +, 1}_1, +, 2}_2, 2) returns
{0, +, 1}_1 */
tree
initial_condition_in_loop_num (tree chrec,
unsigned loop_num)
{
return chrec_component_in_loop_num (chrec, loop_num, false);
}
/* Set or reset the evolution of CHREC to NEW_EVOL in loop LOOP_NUM.
This function is essentially used for setting the evolution to
chrec_dont_know, for example after having determined that it is
impossible to say how many times a loop will execute. */
tree
reset_evolution_in_loop (unsigned loop_num,
tree chrec,
tree new_evol)
{
gcc_assert (chrec_type (chrec) == chrec_type (new_evol));
if (TREE_CODE (chrec) == POLYNOMIAL_CHREC
&& CHREC_VARIABLE (chrec) > loop_num)
{
tree left = reset_evolution_in_loop (loop_num, CHREC_LEFT (chrec),
new_evol);
tree right = reset_evolution_in_loop (loop_num, CHREC_RIGHT (chrec),
new_evol);
return build3 (POLYNOMIAL_CHREC, TREE_TYPE (left),
build_int_cst (NULL_TREE, CHREC_VARIABLE (chrec)),
left, right);
}
while (TREE_CODE (chrec) == POLYNOMIAL_CHREC
&& CHREC_VARIABLE (chrec) == loop_num)
chrec = CHREC_LEFT (chrec);
return build_polynomial_chrec (loop_num, chrec, new_evol);
}
/* Merges two evolution functions that were found by following two
alternate paths of a conditional expression. */
tree
chrec_merge (tree chrec1,
tree chrec2)
{
if (chrec1 == chrec_dont_know
|| chrec2 == chrec_dont_know)
return chrec_dont_know;
if (chrec1 == chrec_known
|| chrec2 == chrec_known)
return chrec_known;
if (chrec1 == chrec_not_analyzed_yet)
return chrec2;
if (chrec2 == chrec_not_analyzed_yet)
return chrec1;
if (eq_evolutions_p (chrec1, chrec2))
return chrec1;
return chrec_dont_know;
}
/* Observers. */
/* Helper function for is_multivariate_chrec. */
static bool
is_multivariate_chrec_rec (tree chrec, unsigned int rec_var)
{
if (chrec == NULL_TREE)
return false;
if (TREE_CODE (chrec) == POLYNOMIAL_CHREC)
{
if (CHREC_VARIABLE (chrec) != rec_var)
return true;
else
return (is_multivariate_chrec_rec (CHREC_LEFT (chrec), rec_var)
|| is_multivariate_chrec_rec (CHREC_RIGHT (chrec), rec_var));
}
else
return false;
}
/* Determine whether the given chrec is multivariate or not. */
bool
is_multivariate_chrec (tree chrec)
{
if (chrec == NULL_TREE)
return false;
if (TREE_CODE (chrec) == POLYNOMIAL_CHREC)
return (is_multivariate_chrec_rec (CHREC_LEFT (chrec),
CHREC_VARIABLE (chrec))
|| is_multivariate_chrec_rec (CHREC_RIGHT (chrec),
CHREC_VARIABLE (chrec)));
else
return false;
}
/* Determines whether the chrec contains symbolic names or not. */
bool
chrec_contains_symbols (tree chrec)
{
if (chrec == NULL_TREE)
return false;
if (TREE_CODE (chrec) == SSA_NAME
|| TREE_CODE (chrec) == VAR_DECL
|| TREE_CODE (chrec) == PARM_DECL
|| TREE_CODE (chrec) == FUNCTION_DECL
|| TREE_CODE (chrec) == LABEL_DECL
|| TREE_CODE (chrec) == RESULT_DECL
|| TREE_CODE (chrec) == FIELD_DECL)
return true;
switch (TREE_CODE_LENGTH (TREE_CODE (chrec)))
{
case 3:
if (chrec_contains_symbols (TREE_OPERAND (chrec, 2)))
return true;
case 2:
if (chrec_contains_symbols (TREE_OPERAND (chrec, 1)))
return true;
case 1:
if (chrec_contains_symbols (TREE_OPERAND (chrec, 0)))
return true;
default:
return false;
}
}
/* Determines whether the chrec contains undetermined coefficients. */
bool
chrec_contains_undetermined (tree chrec)
{
if (chrec == chrec_dont_know
|| chrec == chrec_not_analyzed_yet
|| chrec == NULL_TREE)
return true;
switch (TREE_CODE_LENGTH (TREE_CODE (chrec)))
{
case 3:
if (chrec_contains_undetermined (TREE_OPERAND (chrec, 2)))
return true;
case 2:
if (chrec_contains_undetermined (TREE_OPERAND (chrec, 1)))
return true;
case 1:
if (chrec_contains_undetermined (TREE_OPERAND (chrec, 0)))
return true;
default:
return false;
}
}
/* Determines whether the tree EXPR contains chrecs, and increment
SIZE if it is not a NULL pointer by an estimation of the depth of
the tree. */
bool
tree_contains_chrecs (tree expr, int *size)
{
if (expr == NULL_TREE)
return false;
if (size)
(*size)++;
if (tree_is_chrec (expr))
return true;
switch (TREE_CODE_LENGTH (TREE_CODE (expr)))
{
case 3:
if (tree_contains_chrecs (TREE_OPERAND (expr, 2), size))
return true;
case 2:
if (tree_contains_chrecs (TREE_OPERAND (expr, 1), size))
return true;
case 1:
if (tree_contains_chrecs (TREE_OPERAND (expr, 0), size))
return true;
default:
return false;
}
}
/* Recursive helper function. */
static bool
evolution_function_is_invariant_rec_p (tree chrec, int loopnum)
{
if (evolution_function_is_constant_p (chrec))
return true;
if (TREE_CODE (chrec) == SSA_NAME
&& expr_invariant_in_loop_p (current_loops->parray[loopnum],
chrec))
return true;
if (TREE_CODE (chrec) == POLYNOMIAL_CHREC)
{
if (CHREC_VARIABLE (chrec) == (unsigned) loopnum
|| !evolution_function_is_invariant_rec_p (CHREC_RIGHT (chrec),
loopnum)
|| !evolution_function_is_invariant_rec_p (CHREC_LEFT (chrec),
loopnum))
return false;
return true;
}
switch (TREE_CODE_LENGTH (TREE_CODE (chrec)))
{
case 2:
if (!evolution_function_is_invariant_rec_p (TREE_OPERAND (chrec, 1),
loopnum))
return false;
case 1:
if (!evolution_function_is_invariant_rec_p (TREE_OPERAND (chrec, 0),
loopnum))
return false;
return true;
default:
return false;
}
return false;
}
/* Return true if CHREC is invariant in loop LOOPNUM, false otherwise. */
bool
evolution_function_is_invariant_p (tree chrec, int loopnum)
{
if (evolution_function_is_constant_p (chrec))
return true;
if (current_loops != NULL)
return evolution_function_is_invariant_rec_p (chrec, loopnum);
return false;
}
/* Determine whether the given tree is an affine multivariate
evolution. */
bool
evolution_function_is_affine_multivariate_p (tree chrec)
{
if (chrec == NULL_TREE)
return false;
switch (TREE_CODE (chrec))
{
case POLYNOMIAL_CHREC:
if (evolution_function_is_constant_p (CHREC_LEFT (chrec)))
{
if (evolution_function_is_constant_p (CHREC_RIGHT (chrec)))
return true;
else
{
if (TREE_CODE (CHREC_RIGHT (chrec)) == POLYNOMIAL_CHREC
&& CHREC_VARIABLE (CHREC_RIGHT (chrec))
!= CHREC_VARIABLE (chrec)
&& evolution_function_is_affine_multivariate_p
(CHREC_RIGHT (chrec)))
return true;
else
return false;
}
}
else
{
if (evolution_function_is_constant_p (CHREC_RIGHT (chrec))
&& TREE_CODE (CHREC_LEFT (chrec)) == POLYNOMIAL_CHREC
&& CHREC_VARIABLE (CHREC_LEFT (chrec)) != CHREC_VARIABLE (chrec)
&& evolution_function_is_affine_multivariate_p
(CHREC_LEFT (chrec)))
return true;
else
return false;
}
default:
return false;
}
}
/* Determine whether the given tree is a function in zero or one
variables. */
bool
evolution_function_is_univariate_p (tree chrec)
{
if (chrec == NULL_TREE)
return true;
switch (TREE_CODE (chrec))
{
case POLYNOMIAL_CHREC:
switch (TREE_CODE (CHREC_LEFT (chrec)))
{
case POLYNOMIAL_CHREC:
if (CHREC_VARIABLE (chrec) != CHREC_VARIABLE (CHREC_LEFT (chrec)))
return false;
if (!evolution_function_is_univariate_p (CHREC_LEFT (chrec)))
return false;
break;
default:
break;
}
switch (TREE_CODE (CHREC_RIGHT (chrec)))
{
case POLYNOMIAL_CHREC:
if (CHREC_VARIABLE (chrec) != CHREC_VARIABLE (CHREC_RIGHT (chrec)))
return false;
if (!evolution_function_is_univariate_p (CHREC_RIGHT (chrec)))
return false;
break;
default:
break;
}
default:
return true;
}
}
/* Returns the number of variables of CHREC. Example: the call
nb_vars_in_chrec ({{0, +, 1}_5, +, 2}_6) returns 2. */
unsigned
nb_vars_in_chrec (tree chrec)
{
if (chrec == NULL_TREE)
return 0;
switch (TREE_CODE (chrec))
{
case POLYNOMIAL_CHREC:
return 1 + nb_vars_in_chrec
(initial_condition_in_loop_num (chrec, CHREC_VARIABLE (chrec)));
default:
return 0;
}
}
/* Returns true if TYPE is a type in that we cannot directly perform
arithmetics, even though it is a scalar type. */
static bool
avoid_arithmetics_in_type_p (tree type)
{
/* Ada frontend uses subtypes -- an arithmetic cannot be directly performed
in the subtype, but a base type must be used, and the result then can
be casted to the subtype. */
if (TREE_CODE (type) == INTEGER_TYPE && TREE_TYPE (type) != NULL_TREE)
return true;
return false;
}
static tree chrec_convert_1 (tree, tree, tree, bool);
/* Converts BASE and STEP of affine scev to TYPE. LOOP is the loop whose iv
the scev corresponds to. AT_STMT is the statement at that the scev is
evaluated. USE_OVERFLOW_SEMANTICS is true if this function should assume that
the rules for overflow of the given language apply (e.g., that signed
arithmetics in C does not overflow) -- i.e., to use them to avoid unnecessary
tests, but also to enforce that the result follows them. Returns true if the
conversion succeeded, false otherwise. */
bool
convert_affine_scev (struct loop *loop, tree type,
tree *base, tree *step, tree at_stmt,
bool use_overflow_semantics)
{
tree ct = TREE_TYPE (*step);
bool enforce_overflow_semantics;
bool must_check_src_overflow, must_check_rslt_overflow;
tree new_base, new_step;
/* If we cannot perform arithmetic in TYPE, avoid creating an scev. */
if (avoid_arithmetics_in_type_p (type))
return false;
/* In general,
(TYPE) (BASE + STEP * i) = (TYPE) BASE + (TYPE -- sign extend) STEP * i,
but we must check some assumptions.
1) If [BASE, +, STEP] wraps, the equation is not valid when precision
of CT is smaller than the precision of TYPE. For example, when we
cast unsigned char [254, +, 1] to unsigned, the values on left side
are 254, 255, 0, 1, ..., but those on the right side are
254, 255, 256, 257, ...
2) In case that we must also preserve the fact that signed ivs do not
overflow, we must additionally check that the new iv does not wrap.
For example, unsigned char [125, +, 1] casted to signed char could
become a wrapping variable with values 125, 126, 127, -128, -127, ...,
which would confuse optimizers that assume that this does not
happen. */
must_check_src_overflow = TYPE_PRECISION (ct) < TYPE_PRECISION (type);
enforce_overflow_semantics = (use_overflow_semantics
&& nowrap_type_p (type));
if (enforce_overflow_semantics)
{
/* We can avoid checking whether the result overflows in the following
cases:
-- must_check_src_overflow is true, and the range of TYPE is superset
of the range of CT -- i.e., in all cases except if CT signed and
TYPE unsigned.
-- both CT and TYPE have the same precision and signedness, and we
verify instead that the source does not overflow (this may be
easier than verifying it for the result, as we may use the
information about the semantics of overflow in CT). */
if (must_check_src_overflow)
{
if (TYPE_UNSIGNED (type) && !TYPE_UNSIGNED (ct))
must_check_rslt_overflow = true;
else
must_check_rslt_overflow = false;
}
else if (TYPE_UNSIGNED (ct) == TYPE_UNSIGNED (type)
&& TYPE_PRECISION (ct) == TYPE_PRECISION (type))
{
must_check_rslt_overflow = false;
must_check_src_overflow = true;
}
else
must_check_rslt_overflow = true;
}
else
must_check_rslt_overflow = false;
if (must_check_src_overflow
&& scev_probably_wraps_p (*base, *step, at_stmt, loop,
use_overflow_semantics))
return false;
new_base = chrec_convert_1 (type, *base, at_stmt,
use_overflow_semantics);
/* The step must be sign extended, regardless of the signedness
of CT and TYPE. This only needs to be handled specially when
CT is unsigned -- to avoid e.g. unsigned char [100, +, 255]
(with values 100, 99, 98, ...) from becoming signed or unsigned
[100, +, 255] with values 100, 355, ...; the sign-extension is
performed by default when CT is signed. */
new_step = *step;
if (TYPE_PRECISION (type) > TYPE_PRECISION (ct) && TYPE_UNSIGNED (ct))
new_step = chrec_convert_1 (signed_type_for (ct), new_step, at_stmt,
use_overflow_semantics);
new_step = chrec_convert_1 (type, new_step, at_stmt, use_overflow_semantics);
if (automatically_generated_chrec_p (new_base)
|| automatically_generated_chrec_p (new_step))
return false;
if (must_check_rslt_overflow
/* Note that in this case we cannot use the fact that signed variables
do not overflow, as this is what we are verifying for the new iv. */
&& scev_probably_wraps_p (new_base, new_step, at_stmt, loop, false))
return false;
*base = new_base;
*step = new_step;
return true;
}
/* Convert CHREC to TYPE. When the analyzer knows the context in
which the CHREC is built, it sets AT_STMT to the statement that
contains the definition of the analyzed variable, otherwise the
conversion is less accurate: the information is used for
determining a more accurate estimation of the number of iterations.
By default AT_STMT could be safely set to NULL_TREE.
The following rule is always true: TREE_TYPE (chrec) ==
TREE_TYPE (CHREC_LEFT (chrec)) == TREE_TYPE (CHREC_RIGHT (chrec)).
An example of what could happen when adding two chrecs and the type
of the CHREC_RIGHT is different than CHREC_LEFT is:
{(uint) 0, +, (uchar) 10} +
{(uint) 0, +, (uchar) 250}
that would produce a wrong result if CHREC_RIGHT is not (uint):
{(uint) 0, +, (uchar) 4}
instead of
{(uint) 0, +, (uint) 260}
*/
tree
chrec_convert (tree type, tree chrec, tree at_stmt)
{
return chrec_convert_1 (type, chrec, at_stmt, true);
}
/* Convert CHREC to TYPE. When the analyzer knows the context in
which the CHREC is built, it sets AT_STMT to the statement that
contains the definition of the analyzed variable, otherwise the
conversion is less accurate: the information is used for
determining a more accurate estimation of the number of iterations.
By default AT_STMT could be safely set to NULL_TREE.
USE_OVERFLOW_SEMANTICS is true if this function should assume that
the rules for overflow of the given language apply (e.g., that signed
arithmetics in C does not overflow) -- i.e., to use them to avoid unnecessary
tests, but also to enforce that the result follows them. */
static tree
chrec_convert_1 (tree type, tree chrec, tree at_stmt,
bool use_overflow_semantics)
{
tree ct, res;
tree base, step;
struct loop *loop;
if (automatically_generated_chrec_p (chrec))
return chrec;
ct = chrec_type (chrec);
if (ct == type)
return chrec;
if (!evolution_function_is_affine_p (chrec))
goto keep_cast;
loop = current_loops->parray[CHREC_VARIABLE (chrec)];
base = CHREC_LEFT (chrec);
step = CHREC_RIGHT (chrec);
if (convert_affine_scev (loop, type, &base, &step, at_stmt,
use_overflow_semantics))
return build_polynomial_chrec (loop->num, base, step);
/* If we cannot propagate the cast inside the chrec, just keep the cast. */
keep_cast:
res = fold_convert (type, chrec);
/* Don't propagate overflows. */
if (CONSTANT_CLASS_P (res))
{
TREE_CONSTANT_OVERFLOW (res) = 0;
TREE_OVERFLOW (res) = 0;
}
/* But reject constants that don't fit in their type after conversion.
This can happen if TYPE_MIN_VALUE or TYPE_MAX_VALUE are not the
natural values associated with TYPE_PRECISION and TYPE_UNSIGNED,
and can cause problems later when computing niters of loops. Note
that we don't do the check before converting because we don't want
to reject conversions of negative chrecs to unsigned types. */
if (TREE_CODE (res) == INTEGER_CST
&& TREE_CODE (type) == INTEGER_TYPE
&& !int_fits_type_p (res, type))
res = chrec_dont_know;
return res;
}
/* Convert CHREC to TYPE, without regard to signed overflows. Returns the new
chrec if something else than what chrec_convert would do happens, NULL_TREE
otherwise. */
tree
chrec_convert_aggressive (tree type, tree chrec)
{
tree inner_type, left, right, lc, rc;
if (automatically_generated_chrec_p (chrec)
|| TREE_CODE (chrec) != POLYNOMIAL_CHREC)
return NULL_TREE;
inner_type = TREE_TYPE (chrec);
if (TYPE_PRECISION (type) > TYPE_PRECISION (inner_type))
return NULL_TREE;
/* If we cannot perform arithmetic in TYPE, avoid creating an scev. */
if (avoid_arithmetics_in_type_p (type))
return NULL_TREE;
left = CHREC_LEFT (chrec);
right = CHREC_RIGHT (chrec);
lc = chrec_convert_aggressive (type, left);
if (!lc)
lc = chrec_convert (type, left, NULL_TREE);
rc = chrec_convert_aggressive (type, right);
if (!rc)
rc = chrec_convert (type, right, NULL_TREE);
return build_polynomial_chrec (CHREC_VARIABLE (chrec), lc, rc);
}
/* Returns true when CHREC0 == CHREC1. */
bool
eq_evolutions_p (tree chrec0,
tree chrec1)
{
if (chrec0 == NULL_TREE
|| chrec1 == NULL_TREE
|| TREE_CODE (chrec0) != TREE_CODE (chrec1))
return false;
if (chrec0 == chrec1)
return true;
switch (TREE_CODE (chrec0))
{
case INTEGER_CST:
return operand_equal_p (chrec0, chrec1, 0);
case POLYNOMIAL_CHREC:
return (CHREC_VARIABLE (chrec0) == CHREC_VARIABLE (chrec1)
&& eq_evolutions_p (CHREC_LEFT (chrec0), CHREC_LEFT (chrec1))
&& eq_evolutions_p (CHREC_RIGHT (chrec0), CHREC_RIGHT (chrec1)));
default:
return false;
}
}
/* Returns EV_GROWS if CHREC grows (assuming that it does not overflow),
EV_DECREASES if it decreases, and EV_UNKNOWN if we cannot determine
which of these cases happens. */
enum ev_direction
scev_direction (tree chrec)
{
tree step;
if (!evolution_function_is_affine_p (chrec))
return EV_DIR_UNKNOWN;
step = CHREC_RIGHT (chrec);
if (TREE_CODE (step) != INTEGER_CST)
return EV_DIR_UNKNOWN;
if (tree_int_cst_sign_bit (step))
return EV_DIR_DECREASES;
else
return EV_DIR_GROWS;
}