arb/acb_poly/zeta_series.c

/*=============================================================================

    This file is part of ARB.

    ARB 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 of the License, or
    (at your option) any later version.

    ARB 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 ARB; if not, write to the Free Software
    Foundation, Inc., 51 Franklin St, Fifth Floor, Boston, MA 02110-1301 USA

=============================================================================*/
/******************************************************************************

    Copyright (C) 2014 Fredrik Johansson

******************************************************************************/

#include "acb_poly.h"

void
_acb_poly_zeta_cpx_series(acb_ptr z, const acb_t s, const acb_t a, int deflate, long d, long prec)
{
    ulong M, N;
    long i;
    arf_t bound;
    arb_ptr vb;

    if (d < 1)
        return;

    arf_init(bound);
    vb = _arb_vec_init(d);

    _acb_poly_zeta_em_choose_param(bound, &N, &M, s, a, FLINT_MIN(d, 2), prec, MAG_BITS);
    _acb_poly_zeta_em_bound(vb, s, a, N, M, d, MAG_BITS);

    _acb_poly_zeta_em_sum(z, s, a, deflate, N, M, d, prec);

    for (i = 0; i < d; i++)
    {
        arb_get_abs_ubound_arf(bound, vb + i, MAG_BITS);
        arb_add_error_arf(acb_realref(z + i), bound);
        arb_add_error_arf(acb_imagref(z + i), bound);
    }

    arf_clear(bound);
    _arb_vec_clear(vb, d);
}

void
_acb_poly_zeta_series(acb_ptr res, acb_srcptr h, long hlen, const acb_t a, int deflate, long len, long prec)
{
    long i;
    acb_ptr t, u;

    hlen = FLINT_MIN(hlen, len);

    t = _acb_vec_init(len);
    u = _acb_vec_init(len);

    /* use reflection formula */
    if (arf_sgn(arb_midref(acb_realref(h))) < 0 && acb_is_one(a))
    {
        /* zeta(s) = (2*pi)**s * sin(pi*s/2) / pi * gamma(1-s) * zeta(1-s) */
        acb_t pi;
        acb_ptr f, s1, s2, s3, s4;

        acb_init(pi);
        f = _acb_vec_init(2);
        s1 = _acb_vec_init(len);
        s2 = _acb_vec_init(len);
        s3 = _acb_vec_init(len);
        s4 = _acb_vec_init(len);

        acb_const_pi(pi, prec);

        /* s1 = (2*pi)**s */
        acb_mul_2exp_si(pi, pi, 1);
        _acb_poly_pow_cpx(s1, pi, h, len, prec);
        acb_mul_2exp_si(pi, pi, -1);

        /* s2 = sin(pi*s/2) / pi */
        acb_mul_2exp_si(pi, pi, -1);
        acb_mul(f, pi, h, prec);
        acb_set(f + 1, pi);
        acb_mul_2exp_si(pi, pi, 1);
        _acb_poly_sin_series(s2, f, 2, len, prec);
        _acb_vec_scalar_div(s2, s2, len, pi, prec);

        /* s3 = gamma(1-s) */
        acb_sub_ui(f, h, 1, prec);
        acb_neg(f, f);
        acb_set_si(f + 1, -1);
        _acb_poly_gamma_series(s3, f, 2, len, prec);

        /* s4 = zeta(1-s) */
        acb_sub_ui(f, h, 1, prec);
        acb_neg(f, f);
        _acb_poly_zeta_cpx_series(s4, f, a, 0, len, prec);
        for (i = 1; i < len; i += 2)
            acb_neg(s4 + i, s4 + i);

        _acb_poly_mullow(u, s1, len, s2, len, len, prec);
        _acb_poly_mullow(s1, s3, len, s4, len, len, prec);
        _acb_poly_mullow(t, u, len, s1, len, len, prec);

        /* add 1/(1-(s+t)) = 1/(1-s) + t/(1-s)^2 + ... */
        if (deflate)
        {
            acb_sub_ui(u, h, 1, prec);
            acb_neg(u, u);
            acb_inv(u, u, prec);
            for (i = 1; i < len; i++)
                acb_mul(u + i, u + i - 1, u, prec);
            _acb_vec_add(t, t, u, len, prec);
        }

        acb_clear(pi);
        _acb_vec_clear(f, 2);
        _acb_vec_clear(s1, len);
        _acb_vec_clear(s2, len);
        _acb_vec_clear(s3, len);
        _acb_vec_clear(s4, len);
    }
    else
    {
        _acb_poly_zeta_cpx_series(t, h, a, deflate, len, prec);
    }

    /* compose with nonconstant part */
    acb_zero(u);
    _acb_vec_set(u + 1, h + 1, hlen - 1);
    _acb_poly_compose_series(res, t, len, u, hlen, len, prec);

    _acb_vec_clear(t, len);
    _acb_vec_clear(u, len);
}

void
acb_poly_zeta_series(acb_poly_t res, const acb_poly_t f, const acb_t a, int deflate, long n, long prec)
{
    if (n == 0)
    {
        acb_poly_zero(res);
        return;
    }

    acb_poly_fit_length(res, n);

    if (f->length == 0)
    {
        acb_t t;
        acb_init(t);
        _acb_poly_zeta_series(res->coeffs, t, 1, a, deflate, n, prec);
        acb_clear(t);
    }
    else
    {
        _acb_poly_zeta_series(res->coeffs, f->coeffs, f->length, a, deflate, n, prec);
    }

    _acb_poly_set_length(res, n);
    _acb_poly_normalise(res);
}
port most of the zeta function code 2014-06-13 22:08:25 +02:00			`/*=============================================================================`

			`This file is part of ARB.`

			`ARB 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 of the License, or`
			`(at your option) any later version.`

			`ARB 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 ARB; if not, write to the Free Software`
			`Foundation, Inc., 51 Franklin St, Fifth Floor, Boston, MA 02110-1301 USA`

			`=============================================================================*/`
			`/******************************************************************************`

			`Copyright (C) 2014 Fredrik Johansson`

			`******************************************************************************/`

			`#include "acb_poly.h"`

			`void`
			`_acb_poly_zeta_cpx_series(acb_ptr z, const acb_t s, const acb_t a, int deflate, long d, long prec)`
			`{`
			`ulong M, N;`
			`long i;`
			`arf_t bound;`
			`arb_ptr vb;`

			`if (d < 1)`
			`return;`

			`arf_init(bound);`
			`vb = _arb_vec_init(d);`

			`_acb_poly_zeta_em_choose_param(bound, &N, &M, s, a, FLINT_MIN(d, 2), prec, MAG_BITS);`
			`_acb_poly_zeta_em_bound(vb, s, a, N, M, d, MAG_BITS);`

			`_acb_poly_zeta_em_sum(z, s, a, deflate, N, M, d, prec);`

			`for (i = 0; i < d; i++)`
			`{`
			`arb_get_abs_ubound_arf(bound, vb + i, MAG_BITS);`
			`arb_add_error_arf(acb_realref(z + i), bound);`
			`arb_add_error_arf(acb_imagref(z + i), bound);`
			`}`

			`arf_clear(bound);`
			`_arb_vec_clear(vb, d);`
			`}`

			`void`
			`_acb_poly_zeta_series(acb_ptr res, acb_srcptr h, long hlen, const acb_t a, int deflate, long len, long prec)`
			`{`
			`long i;`
			`acb_ptr t, u;`

			`hlen = FLINT_MIN(hlen, len);`

			`t = _acb_vec_init(len);`
			`u = _acb_vec_init(len);`

			`/* use reflection formula */`
			`if (arf_sgn(arb_midref(acb_realref(h))) < 0 && acb_is_one(a))`
			`{`
			`/* zeta(s) = (2pi)s sin(pis/2) / pi gamma(1-s) * zeta(1-s) */`
			`acb_t pi;`
			`acb_ptr f, s1, s2, s3, s4;`

			`acb_init(pi);`
			`f = _acb_vec_init(2);`
			`s1 = _acb_vec_init(len);`
			`s2 = _acb_vec_init(len);`
			`s3 = _acb_vec_init(len);`
			`s4 = _acb_vec_init(len);`

			`acb_const_pi(pi, prec);`

			`/* s1 = (2pi)s /`
			`acb_mul_2exp_si(pi, pi, 1);`
			`_acb_poly_pow_cpx(s1, pi, h, len, prec);`
			`acb_mul_2exp_si(pi, pi, -1);`

			`/* s2 = sin(pis/2) / pi /`
			`acb_mul_2exp_si(pi, pi, -1);`
			`acb_mul(f, pi, h, prec);`
			`acb_set(f + 1, pi);`
			`acb_mul_2exp_si(pi, pi, 1);`
			`_acb_poly_sin_series(s2, f, 2, len, prec);`
			`_acb_vec_scalar_div(s2, s2, len, pi, prec);`

			`/* s3 = gamma(1-s) */`
			`acb_sub_ui(f, h, 1, prec);`
			`acb_neg(f, f);`
			`acb_set_si(f + 1, -1);`
			`_acb_poly_gamma_series(s3, f, 2, len, prec);`

			`/* s4 = zeta(1-s) */`
			`acb_sub_ui(f, h, 1, prec);`
			`acb_neg(f, f);`
			`_acb_poly_zeta_cpx_series(s4, f, a, 0, len, prec);`
			`for (i = 1; i < len; i += 2)`
			`acb_neg(s4 + i, s4 + i);`

			`_acb_poly_mullow(u, s1, len, s2, len, len, prec);`
			`_acb_poly_mullow(s1, s3, len, s4, len, len, prec);`
			`_acb_poly_mullow(t, u, len, s1, len, len, prec);`

			`/* add 1/(1-(s+t)) = 1/(1-s) + t/(1-s)^2 + ... */`
			`if (deflate)`
			`{`
			`acb_sub_ui(u, h, 1, prec);`
			`acb_neg(u, u);`
			`acb_inv(u, u, prec);`
			`for (i = 1; i < len; i++)`
			`acb_mul(u + i, u + i - 1, u, prec);`
			`_acb_vec_add(t, t, u, len, prec);`
			`}`

			`acb_clear(pi);`
			`_acb_vec_clear(f, 2);`
			`_acb_vec_clear(s1, len);`
			`_acb_vec_clear(s2, len);`
			`_acb_vec_clear(s3, len);`
			`_acb_vec_clear(s4, len);`
			`}`
			`else`
			`{`
			`_acb_poly_zeta_cpx_series(t, h, a, deflate, len, prec);`
			`}`

			`/* compose with nonconstant part */`
			`acb_zero(u);`
			`_acb_vec_set(u + 1, h + 1, hlen - 1);`
			`_acb_poly_compose_series(res, t, len, u, hlen, len, prec);`

			`_acb_vec_clear(t, len);`
			`_acb_vec_clear(u, len);`
			`}`

			`void`
			`acb_poly_zeta_series(acb_poly_t res, const acb_poly_t f, const acb_t a, int deflate, long n, long prec)`
			`{`
			`if (n == 0)`
			`{`
			`acb_poly_zero(res);`
			`return;`
			`}`

			`acb_poly_fit_length(res, n);`

			`if (f->length == 0)`
			`{`
			`acb_t t;`
			`acb_init(t);`
			`_acb_poly_zeta_series(res->coeffs, t, 1, a, deflate, n, prec);`
			`acb_clear(t);`
			`}`
			`else`
			`{`
			`_acb_poly_zeta_series(res->coeffs, f->coeffs, f->length, a, deflate, n, prec);`
			`}`

			`_acb_poly_set_length(res, n);`
			`_acb_poly_normalise(res);`
			`}`