2014-06-13 22:08:25 +02:00
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/*=============================================================================
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This file is part of ARB.
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ARB is free software; you can redistribute it and/or modify
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it under the terms of the GNU General Public License as published by
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the Free Software Foundation; either version 2 of the License, or
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(at your option) any later version.
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ARB is distributed in the hope that it will be useful,
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but WITHOUT ANY WARRANTY; without even the implied warranty of
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MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the
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GNU General Public License 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 ARB; if not, write to the Free Software
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Foundation, Inc., 51 Franklin St, Fifth Floor, Boston, MA 02110-1301 USA
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=============================================================================*/
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/******************************************************************************
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Copyright (C) 2014 Fredrik Johansson
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******************************************************************************/
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#include "acb_poly.h"
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/* res = src * (c + x) */
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2015-11-05 17:51:23 +00:00
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void _acb_poly_mullow_cpx(acb_ptr res, acb_srcptr src, slong len, const acb_t c, slong trunc, slong prec)
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2014-06-13 22:08:25 +02:00
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{
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2015-11-05 17:51:23 +00:00
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slong i;
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2014-06-13 22:08:25 +02:00
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if (len < trunc)
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acb_set(res + len, src + len - 1);
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for (i = len - 1; i > 0; i--)
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{
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acb_mul(res + i, src + i, c, prec);
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acb_add(res + i, res + i, src + i - 1, prec);
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}
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acb_mul(res, src, c, prec);
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}
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void
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2015-11-05 17:51:23 +00:00
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_acb_poly_zeta_em_sum(acb_ptr z, const acb_t s, const acb_t a, int deflate, ulong N, ulong M, slong d, slong prec)
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2014-06-13 22:08:25 +02:00
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{
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acb_ptr t, u, v, term, sum;
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2014-07-05 17:38:02 +02:00
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acb_t Na, one;
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2015-11-05 17:51:23 +00:00
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slong i;
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2014-06-13 22:08:25 +02:00
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t = _acb_vec_init(d + 1);
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u = _acb_vec_init(d);
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v = _acb_vec_init(d);
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term = _acb_vec_init(d);
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sum = _acb_vec_init(d);
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acb_init(Na);
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acb_init(one);
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2014-06-13 22:08:25 +02:00
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prec += 2 * (FLINT_BIT_COUNT(N) + FLINT_BIT_COUNT(d));
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acb_one(one);
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2014-06-13 22:08:25 +02:00
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/* sum 1/(k+a)^(s+x) */
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if (acb_is_one(a) && d <= 3)
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_acb_poly_powsum_one_series_sieved(sum, s, N, d, prec);
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else if (N > 50 && flint_get_num_threads() > 1)
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_acb_poly_powsum_series_naive_threaded(sum, s, a, one, N, d, prec);
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2014-06-13 22:08:25 +02:00
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else
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_acb_poly_powsum_series_naive(sum, s, a, one, N, d, prec);
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2014-06-13 22:08:25 +02:00
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/* t = 1/(N+a)^(s+x); we might need one extra term for deflation */
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acb_add_ui(Na, a, N, prec);
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_acb_poly_acb_invpow_cpx(t, Na, s, d + 1, prec);
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/* sum += (N+a) * 1/((s+x)-1) * t */
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if (!deflate)
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{
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/* u = (N+a)^(1-(s+x)) */
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acb_sub_ui(v, s, 1, prec);
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_acb_poly_acb_invpow_cpx(u, Na, v, d, prec);
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/* divide by 1/((s-1) + x) */
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acb_sub_ui(v, s, 1, prec);
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acb_div(u, u, v, prec);
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for (i = 1; i < d; i++)
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{
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acb_sub(u + i, u + i, u + i - 1, prec);
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acb_div(u + i, u + i, v, prec);
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}
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_acb_vec_add(sum, sum, u, d, prec);
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}
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/* sum += ((N+a)^(1-(s+x)) - 1) / ((s+x) - 1) */
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else
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{
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/* at s = 1, this becomes (N*t - 1)/x, i.e. just remove one coeff */
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if (acb_is_one(s))
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{
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for (i = 0; i < d; i++)
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acb_mul(u + i, t + i + 1, Na, prec);
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_acb_vec_add(sum, sum, u, d, prec);
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}
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else
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{
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/* TODO: this is numerically unstable for large derivatives,
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and divides by zero if s contains 1. We want a good
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way to evaluate the power series ((N+a)^y - 1) / y where y has
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nonzero constant term, without doing a division.
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How is this best done? */
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_acb_vec_scalar_mul(t, t, d, Na, prec);
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acb_sub_ui(t + 0, t + 0, 1, prec);
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acb_sub_ui(u + 0, s, 1, prec);
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acb_inv(u + 0, u + 0, prec);
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for (i = 1; i < d; i++)
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acb_mul(u + i, u + i - 1, u + 0, prec);
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for (i = 1; i < d; i += 2)
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acb_neg(u + i, u + i);
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_acb_poly_mullow(v, u, d, t, d, d, prec);
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_acb_vec_add(sum, sum, v, d, prec);
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_acb_poly_acb_invpow_cpx(t, Na, s, d, prec);
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}
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}
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/* sum += u = 1/2 * t */
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_acb_vec_scalar_mul_2exp_si(u, t, d, -1L);
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_acb_vec_add(sum, sum, u, d, prec);
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/* Euler-Maclaurin formula tail */
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if (d < 5 || d < M / 10)
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_acb_poly_zeta_em_tail_naive(u, s, Na, t, M, d, prec);
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else
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_acb_poly_zeta_em_tail_bsplit(u, s, Na, t, M, d, prec);
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_acb_vec_add(z, sum, u, d, prec);
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_acb_vec_clear(t, d + 1);
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_acb_vec_clear(u, d);
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_acb_vec_clear(v, d);
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_acb_vec_clear(term, d);
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_acb_vec_clear(sum, d);
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acb_clear(Na);
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acb_clear(one);
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2014-06-13 22:08:25 +02:00
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}
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