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clang-p2996/libc/AOR_v20.02/math/tools/exp.sollya
Kristof Beyls 0928368f62 [libc] Provide Arm Optimized Routines for the LLVM libc project.
This adds the Arm Optimized Routines (see
https://github.com/ARM-software/optimized-routines) source code under the
the LLVM license. The version of the code provided in this patch is v20.02
of the Arm Optimized Routines project.

This entire contribution is being committed as is even though it does
not currently fit the LLVM libc model and does not follow the LLVM
coding style. In the near future, implementations from this patch will be
moved over to their right place in the LLVM-libc tree. This will be done
over many small patches, all of which will go through the normal LLVM code
review process. See this libc-dev post for the plan:
http://lists.llvm.org/pipermail/libc-dev/2020-March/000044.html

Differential revision of the original upload: https://reviews.llvm.org/D75355
2020-03-16 12:19:31 -07:00

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// polynomial for approximating e^x
//
// Part of the LLVM Project, under the Apache License v2.0 with LLVM Exceptions.
// See https://llvm.org/LICENSE.txt for license information.
// SPDX-License-Identifier: Apache-2.0 WITH LLVM-exception
deg = 5; // poly degree
N = 128; // table entries
b = log(2)/(2*N); // interval
b = b + b*0x1p-16; // increase interval for non-nearest rounding (TOINT_NARROW)
a = -b;
// find polynomial with minimal abs error
// return p that minimizes |exp(x) - poly(x) - x^d*p(x)|
approx = proc(poly,d) {
return remez(exp(x)-poly(x), deg-d, [a;b], x^d, 1e-10);
};
// first 2 coeffs are fixed, iteratively find optimal double prec coeffs
poly = 1 + x;
for i from 2 to deg do {
p = roundcoefficients(approx(poly,i), [|D ...|]);
poly = poly + x^i*coeff(p,0);
};
display = hexadecimal;
print("rel error:", accurateinfnorm(1-poly(x)/exp(x), [a;b], 30));
print("abs error:", accurateinfnorm(exp(x)-poly(x), [a;b], 30));
print("in [",a,b,"]");
// double interval error for non-nearest rounding
print("rel2 error:", accurateinfnorm(1-poly(x)/exp(x), [2*a;2*b], 30));
print("abs2 error:", accurateinfnorm(exp(x)-poly(x), [2*a;2*b], 30));
print("in [",2*a,2*b,"]");
print("coeffs:");
for i from 0 to deg do coeff(poly,i);