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64-by-32-bit divisions are prominent in the kernel, even on 32-bit machines. Luckily, many of them use a constant divisor that allows for a much faster multiplication by the divisor's reciprocal. The compiler already performs this optimization when compiling a 32-by-32 division with a constant divisor. Unfortunately, on 32-bit machines, gcc does not optimize 64-by-32 divisions in that case, except for constant divisors that happen to be a power of 2. Let's avoid the slow path whenever the divisor is constant by manually computing the reciprocal ourselves and performing the multiplication inline. In most cases, this improves performance of 64-by-32 divisions by about two orders of magnitude compared to the __div64_32() fallback, especially on architectures lacking a native div instruction. The algorithm used here comes from the existing ARM code. The __div64_const32_is_OK macro can be predefined by architectures to disable this optimization in some cases. For example, some ancient gcc version on ARM would crash with an ICE when fed this code. Signed-off-by: Nicolas Pitre <nico@linaro.org> Acked-by: Alexey Brodkin <abrodkin@synopsys.com>
212 lines
6.5 KiB
C
212 lines
6.5 KiB
C
#ifndef _ASM_GENERIC_DIV64_H
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#define _ASM_GENERIC_DIV64_H
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/*
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* Copyright (C) 2003 Bernardo Innocenti <bernie@develer.com>
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* Based on former asm-ppc/div64.h and asm-m68knommu/div64.h
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*
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* Optimization for constant divisors on 32-bit machines:
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* Copyright (C) 2006-2015 Nicolas Pitre
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*
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* The semantics of do_div() are:
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*
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* uint32_t do_div(uint64_t *n, uint32_t base)
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* {
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* uint32_t remainder = *n % base;
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* *n = *n / base;
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* return remainder;
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* }
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*
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* NOTE: macro parameter n is evaluated multiple times,
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* beware of side effects!
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*/
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#include <linux/types.h>
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#include <linux/compiler.h>
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#if BITS_PER_LONG == 64
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# define do_div(n,base) ({ \
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uint32_t __base = (base); \
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uint32_t __rem; \
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__rem = ((uint64_t)(n)) % __base; \
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(n) = ((uint64_t)(n)) / __base; \
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__rem; \
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})
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#elif BITS_PER_LONG == 32
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#include <linux/log2.h>
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/*
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* If the divisor happens to be constant, we determine the appropriate
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* inverse at compile time to turn the division into a few inline
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* multiplications which ought to be much faster. And yet only if compiling
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* with a sufficiently recent gcc version to perform proper 64-bit constant
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* propagation.
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*
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* (It is unfortunate that gcc doesn't perform all this internally.)
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*/
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#ifndef __div64_const32_is_OK
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#define __div64_const32_is_OK (__GNUC__ >= 4)
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#endif
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#define __div64_const32(n, ___b) \
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({ \
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/* \
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* Multiplication by reciprocal of b: n / b = n * (p / b) / p \
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* \
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* We rely on the fact that most of this code gets optimized \
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* away at compile time due to constant propagation and only \
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* a few multiplication instructions should remain. \
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* Hence this monstrous macro (static inline doesn't always \
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* do the trick here). \
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*/ \
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uint64_t ___res, ___x, ___t, ___m, ___n = (n); \
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uint32_t ___p, ___bias, ___m_lo, ___m_hi, ___n_lo, ___n_hi; \
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\
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/* determine MSB of b */ \
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___p = 1 << ilog2(___b); \
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\
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/* compute m = ((p << 64) + b - 1) / b */ \
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___m = (~0ULL / ___b) * ___p; \
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___m += (((~0ULL % ___b + 1) * ___p) + ___b - 1) / ___b; \
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\
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/* one less than the dividend with highest result */ \
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___x = ~0ULL / ___b * ___b - 1; \
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\
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/* test our ___m with res = m * x / (p << 64) */ \
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___res = ((___m & 0xffffffff) * (___x & 0xffffffff)) >> 32; \
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___t = ___res += (___m & 0xffffffff) * (___x >> 32); \
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___res += (___x & 0xffffffff) * (___m >> 32); \
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___t = (___res < ___t) ? (1ULL << 32) : 0; \
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___res = (___res >> 32) + ___t; \
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___res += (___m >> 32) * (___x >> 32); \
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___res /= ___p; \
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\
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/* Now sanitize and optimize what we've got. */ \
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if (~0ULL % (___b / (___b & -___b)) == 0) { \
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/* special case, can be simplified to ... */ \
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___n /= (___b & -___b); \
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___m = ~0ULL / (___b / (___b & -___b)); \
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___p = 1; \
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___bias = 1; \
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} else if (___res != ___x / ___b) { \
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/* \
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* We can't get away without a bias to compensate \
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* for bit truncation errors. To avoid it we'd need an \
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* additional bit to represent m which would overflow \
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* a 64-bit variable. \
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* \
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* Instead we do m = p / b and n / b = (n * m + m) / p. \
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*/ \
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___bias = 1; \
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/* Compute m = (p << 64) / b */ \
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___m = (~0ULL / ___b) * ___p; \
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___m += ((~0ULL % ___b + 1) * ___p) / ___b; \
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} else { \
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/* \
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* Reduce m / p, and try to clear bit 31 of m when \
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* possible, otherwise that'll need extra overflow \
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* handling later. \
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*/ \
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uint32_t ___bits = -(___m & -___m); \
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___bits |= ___m >> 32; \
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___bits = (~___bits) << 1; \
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/* \
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* If ___bits == 0 then setting bit 31 is unavoidable. \
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* Simply apply the maximum possible reduction in that \
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* case. Otherwise the MSB of ___bits indicates the \
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* best reduction we should apply. \
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*/ \
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if (!___bits) { \
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___p /= (___m & -___m); \
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___m /= (___m & -___m); \
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} else { \
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___p >>= ilog2(___bits); \
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___m >>= ilog2(___bits); \
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} \
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/* No bias needed. */ \
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___bias = 0; \
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} \
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\
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/* \
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* Now we have a combination of 2 conditions: \
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* \
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* 1) whether or not we need to apply a bias, and \
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* \
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* 2) whether or not there might be an overflow in the cross \
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* product determined by (___m & ((1 << 63) | (1 << 31))). \
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* \
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* Select the best way to do (m_bias + m * n) / (p << 64). \
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* From now on there will be actual runtime code generated. \
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*/ \
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\
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___m_lo = ___m; \
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___m_hi = ___m >> 32; \
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___n_lo = ___n; \
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___n_hi = ___n >> 32; \
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\
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if (!___bias) { \
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___res = ((uint64_t)___m_lo * ___n_lo) >> 32; \
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} else if (!(___m & ((1ULL << 63) | (1ULL << 31)))) { \
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___res = (___m + (uint64_t)___m_lo * ___n_lo) >> 32; \
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} else { \
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___res = ___m + (uint64_t)___m_lo * ___n_lo; \
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___t = (___res < ___m) ? (1ULL << 32) : 0; \
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___res = (___res >> 32) + ___t; \
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} \
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\
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if (!(___m & ((1ULL << 63) | (1ULL << 31)))) { \
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___res += (uint64_t)___m_lo * ___n_hi; \
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___res += (uint64_t)___m_hi * ___n_lo; \
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___res >>= 32; \
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} else { \
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___t = ___res += (uint64_t)___m_lo * ___n_hi; \
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___res += (uint64_t)___m_hi * ___n_lo; \
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___t = (___res < ___t) ? (1ULL << 32) : 0; \
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___res = (___res >> 32) + ___t; \
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} \
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\
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___res += (uint64_t)___m_hi * ___n_hi; \
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\
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___res /= ___p; \
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})
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extern uint32_t __div64_32(uint64_t *dividend, uint32_t divisor);
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/* The unnecessary pointer compare is there
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* to check for type safety (n must be 64bit)
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*/
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# define do_div(n,base) ({ \
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uint32_t __base = (base); \
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uint32_t __rem; \
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(void)(((typeof((n)) *)0) == ((uint64_t *)0)); \
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if (__builtin_constant_p(__base) && \
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is_power_of_2(__base)) { \
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__rem = (n) & (__base - 1); \
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(n) >>= ilog2(__base); \
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} else if (__div64_const32_is_OK && \
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__builtin_constant_p(__base) && \
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__base != 0) { \
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uint32_t __res_lo, __n_lo = (n); \
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(n) = __div64_const32(n, __base); \
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/* the remainder can be computed with 32-bit regs */ \
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__res_lo = (n); \
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__rem = __n_lo - __res_lo * __base; \
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} else if (likely(((n) >> 32) == 0)) { \
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__rem = (uint32_t)(n) % __base; \
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(n) = (uint32_t)(n) / __base; \
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} else \
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__rem = __div64_32(&(n), __base); \
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__rem; \
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})
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#else /* BITS_PER_LONG == ?? */
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# error do_div() does not yet support the C64
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#endif /* BITS_PER_LONG */
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#endif /* _ASM_GENERIC_DIV64_H */
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