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[/] [openrisc/] [trunk/] [gnu-dev/] [or1k-gcc/] [gcc/] [hwint.c] - Blame information for rev 722

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1 684 jeremybenn
/* Operations on HOST_WIDE_INT.
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   Copyright (C) 1987, 1988, 1989, 1992, 1993, 1994, 1995, 1996, 1997, 1998,
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   1999, 2000, 2001, 2002, 2003, 2004, 2005, 2006, 2007, 2008, 2009, 2010
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   Free Software Foundation, Inc.
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This file is part of GCC.
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GCC is free software; you can redistribute it and/or modify it under
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the terms of the GNU General Public License as published by the Free
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Software Foundation; either version 3, or (at your option) any later
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version.
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GCC is distributed in the hope that it will be useful, but WITHOUT ANY
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WARRANTY; without even the implied warranty of MERCHANTABILITY or
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FITNESS FOR A PARTICULAR PURPOSE.  See the GNU General Public License
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for more details.
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You should have received a copy of the GNU General Public License
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along with GCC; see the file COPYING3.  If not see
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<http://www.gnu.org/licenses/>.  */
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#include "config.h"
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#include "system.h"
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#include "diagnostic-core.h"
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#if GCC_VERSION < 3004
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/* The functions clz_hwi, ctz_hwi, ffs_hwi, floor_log2 and exact_log2
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   are defined as inline functions in hwint.h if GCC_VERSION >= 3004.
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   The definitions here are used for older versions of GCC and non-GCC
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   bootstrap compilers.  */
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/* Given X, an unsigned number, return the largest int Y such that 2**Y <= X.
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   If X is 0, return -1.  */
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int
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floor_log2 (unsigned HOST_WIDE_INT x)
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{
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  int t = 0;
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  if (x == 0)
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    return -1;
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  if (HOST_BITS_PER_WIDE_INT > 64)
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    if (x >= (unsigned HOST_WIDE_INT) 1 << (t + 64))
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      t += 64;
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  if (HOST_BITS_PER_WIDE_INT > 32)
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    if (x >= ((unsigned HOST_WIDE_INT) 1) << (t + 32))
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      t += 32;
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  if (x >= ((unsigned HOST_WIDE_INT) 1) << (t + 16))
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    t += 16;
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  if (x >= ((unsigned HOST_WIDE_INT) 1) << (t + 8))
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    t += 8;
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  if (x >= ((unsigned HOST_WIDE_INT) 1) << (t + 4))
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    t += 4;
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  if (x >= ((unsigned HOST_WIDE_INT) 1) << (t + 2))
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    t += 2;
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  if (x >= ((unsigned HOST_WIDE_INT) 1) << (t + 1))
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    t += 1;
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  return t;
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}
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/* Return the logarithm of X, base 2, considering X unsigned,
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   if X is a power of 2.  Otherwise, returns -1.  */
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int
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exact_log2 (unsigned HOST_WIDE_INT x)
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{
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  if (x != (x & -x))
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    return -1;
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  return floor_log2 (x);
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}
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/* Given X, an unsigned number, return the number of least significant bits
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   that are zero.  When X == 0, the result is the word size.  */
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int
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ctz_hwi (unsigned HOST_WIDE_INT x)
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{
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  return x ? floor_log2 (x & -x) : HOST_BITS_PER_WIDE_INT;
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}
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/* Similarly for most significant bits.  */
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int
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clz_hwi (unsigned HOST_WIDE_INT x)
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{
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  return HOST_BITS_PER_WIDE_INT - 1 - floor_log2(x);
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}
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/* Similar to ctz_hwi, except that the least significant bit is numbered
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   starting from 1, and X == 0 yields 0.  */
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int
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ffs_hwi (unsigned HOST_WIDE_INT x)
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{
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  return 1 + floor_log2 (x & -x);
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}
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#endif /* GCC_VERSION < 3004 */
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/* Compute the absolute value of X.  */
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HOST_WIDE_INT
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abs_hwi (HOST_WIDE_INT x)
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{
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  gcc_checking_assert (x != HOST_WIDE_INT_MIN);
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  return x >= 0 ? x : -x;
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}
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/* Compute the absolute value of X as an unsigned type.  */
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unsigned HOST_WIDE_INT
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absu_hwi (HOST_WIDE_INT x)
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{
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  return x >= 0 ? (unsigned HOST_WIDE_INT)x : -(unsigned HOST_WIDE_INT)x;
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}
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/* Compute the greatest common divisor of two numbers A and B using
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   Euclid's algorithm.  */
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HOST_WIDE_INT
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gcd (HOST_WIDE_INT a, HOST_WIDE_INT b)
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{
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  HOST_WIDE_INT x, y, z;
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  x = abs_hwi (a);
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  y = abs_hwi (b);
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  while (x > 0)
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    {
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      z = y % x;
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      y = x;
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      x = z;
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    }
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  return y;
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}
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/* For X and Y positive integers, return X multiplied by Y and check
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   that the result does not overflow.  */
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HOST_WIDE_INT
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pos_mul_hwi (HOST_WIDE_INT x, HOST_WIDE_INT y)
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{
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  if (x != 0)
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    gcc_checking_assert ((HOST_WIDE_INT_MAX) / x >= y);
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  return x * y;
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}
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/* Return X multiplied by Y and check that the result does not
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   overflow.  */
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HOST_WIDE_INT
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mul_hwi (HOST_WIDE_INT x, HOST_WIDE_INT y)
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{
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  gcc_checking_assert (x != HOST_WIDE_INT_MIN
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                       && y != HOST_WIDE_INT_MIN);
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  if (x >= 0)
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    {
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      if (y >= 0)
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        return pos_mul_hwi (x, y);
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      return -pos_mul_hwi (x, -y);
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    }
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  if (y >= 0)
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    return -pos_mul_hwi (-x, y);
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  return pos_mul_hwi (-x, -y);
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}
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/* Compute the least common multiple of two numbers A and B .  */
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HOST_WIDE_INT
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least_common_multiple (HOST_WIDE_INT a, HOST_WIDE_INT b)
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{
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  return mul_hwi (abs_hwi (a) / gcd (a, b), abs_hwi (b));
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}

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