static void
aran_multipole_translate_vertical (const AranSphericalSeriesd * src,
AranSphericalSeriesd * dst,
gdouble r,
gdouble cost,
gdouble cosp, gdouble sinp)
{
gint l, m;
gint n;
gdouble rpow[dst->negdeg];
gdouble pow;
gcomplex128 *srcterm, *dstterm;
gint d = MAX (src->negdeg, dst->negdeg) - 1;
if (src->negdeg > dst->negdeg)
g_warning ("could loose precision in \"%s\"\n", __PRETTY_FUNCTION__);
aran_spherical_seriesd_alpha_require (d);
aran_spherical_seriesd_beta_require (d);
pow = 1.;
for (l = 0; l < dst->negdeg; l++)
{
rpow[l] = pow;
pow *= r;
for (m = 0; m <= l; m++)
{
dstterm = _spherical_seriesd_get_neg_term (dst, l, m);
for (n = m; n <= MIN (l, src->negdeg - 1); n++)
{
gdouble normaliz = aran_spherical_seriesd_beta (l) /
aran_spherical_seriesd_beta (n);
gdouble factor;
gdouble h;
srcterm = _spherical_seriesd_get_neg_term (src, n, 0);
/* m-o = 0 */
factor =
aran_spherical_seriesd_alpha (l - n, 0) *
aran_spherical_seriesd_alpha (n, m) /
aran_spherical_seriesd_alpha (l, m);
/* h= Y_(l-n)^(m-o) */
/*
* in this case, h=Y_(l-n)^0, which simplifies with "normaliz"
* removing beta(l-n)
* and then becomes h = P_(l-n)^0 = (cost)^(l-n)
*/
h = ((l-n)%2 == 0)? 1. : cost;
*dstterm += h * srcterm[m] * factor * normaliz *
rpow[l - n];
}
}
}
}
static void aran_local_translate (const AranSphericalSeriesd * src,
AranSphericalSeriesd * dst,
gdouble r,
gdouble cost, gdouble sint,
gdouble cosp, gdouble sinp)
{
gint l, m;
gint n, o;
gdouble rpow[src->posdeg + 1];
gdouble pow;
gcomplex128 *srcterm, *dstterm, *hterm;
gint d = MAX (src->posdeg, dst->posdeg);
gcomplex128 harmonics[((d + 1) * (d + 2)) / 2];
gcomplex128 expp = cosp + G_I * sinp;
if (src->posdeg > dst->posdeg)
g_warning ("could loose precision in \"%s\"\n", __PRETTY_FUNCTION__);
aran_spherical_seriesd_beta_require (d);
aran_spherical_seriesd_alpha_require (d);
aran_spherical_harmonic_evaluate_multiple_internal (src->posdeg, cost, sint,
expp, harmonics);
pow = 1.;
for (l = 0; l <= src->posdeg; l++)
{
rpow[l] = pow;
pow *= r;
}
for (l = 0; l <= dst->posdeg; l++)
{
for (m = 0; m <= l; m++)
{
dstterm = _spherical_seriesd_get_pos_term (dst, l, m);
for (n = l; n <= src->posdeg; n++)
{
gdouble normaliz = aran_spherical_seriesd_beta (n - l) *
aran_spherical_seriesd_beta (l) /
aran_spherical_seriesd_beta (n);
gcomplex128 sum = 0.;
srcterm = _spherical_seriesd_get_pos_term (src, n, 0);
hterm = aran_spherical_harmonic_multiple_get_term (n - l, 0,
harmonics);
for (o = l + m - n; o <= m + n - l; o++)
{
gint o_m_m = o - m;
guint abs_o_m_m = ABS (o_m_m);
gdouble factor =
aran_spherical_seriesd_alpha (n - l, abs_o_m_m) *
aran_spherical_seriesd_alpha (l, ABS (m)) /
aran_spherical_seriesd_alpha (n, ABS (o));
gcomplex128 h = hterm[abs_o_m_m];
/* h = Y_(n-l)^(o-m) */
if (o_m_m < 0)
h = _sph_sym (h, abs_o_m_m);
if (o >= 0)
h *= srcterm[o];
else
h *= _sph_sym (srcterm[-o], -o);
sum += h * factor;
}
*dstterm += sum * (normaliz * rpow[n - l]);
}
}
}
}
static void aran_multipole_to_local (const AranSphericalSeriesd * src,
AranSphericalSeriesd * dst,
gdouble r,
gdouble cost, gdouble sint,
gdouble cosp, gdouble sinp)
{
gint l, m;
gint n, o;
gint d = dst->posdeg + src->negdeg;
gdouble rpow[d + 1];
gdouble pow, inv_r;
gcomplex128 *srcterm, *dstterm, *hterm;
gcomplex128 harmonics[((d + 1) * (d + 2)) / 2];
gcomplex128 expp = cosp + G_I * sinp;
gdouble sign;
/* if ((src->negdeg-1) > dst->posdeg) */
/* g_warning ("could loose precision in \"%s\"\n", __PRETTY_FUNCTION__); */
/* vertical translation */
if (ABS (sint) < 1.e-5) /* sint in m2l translation is zero or high values */
{
aran_spherical_seriesd_multipole_to_local_vertical (src, dst, r,
cost, cosp, sinp);
return;
}
aran_spherical_seriesd_alpha_require (d);
aran_spherical_seriesd_beta_require (d);
aran_spherical_harmonic_evaluate_multiple_internal (d, cost, sint, expp,
harmonics);
inv_r = 1. / r;
pow = 1.;
for (l = 0; l <= d; l++)
{
rpow[l] = pow;
pow *= inv_r;
}
sign = 1.;
for (l = 0; l <= dst->posdeg; l++)
{
for (m = 0; m <= l; m++)
{
dstterm = _spherical_seriesd_get_pos_term (dst, l, m);
for (n = 0; n < src->negdeg; n++)
{
gdouble normaliz = aran_spherical_seriesd_beta (l + n) *
aran_spherical_seriesd_beta (l) /
aran_spherical_seriesd_beta (n);
gcomplex128 sum = 0.;
srcterm = _spherical_seriesd_get_neg_term (src, n, 0);
hterm = aran_spherical_harmonic_multiple_get_term (l + n, 0,
harmonics);
sum = aran_spherical_seriesd_alpha (l, m) *
aran_spherical_seriesd_alpha (n, 0) /
aran_spherical_seriesd_alpha (l + n, m) * hterm[m] *
srcterm[0];
for (o = 1; o <= n; o++)
{
guint m_p_o = m + o;
gdouble factor = aran_spherical_seriesd_alpha (l, m) *
aran_spherical_seriesd_alpha (n, o);
/* h= Y_(l+n)^(m+o) */
gcomplex128 h = hterm[m_p_o];
sum += h * srcterm[o] * factor /
aran_spherical_seriesd_alpha (l + n, m_p_o);
m_p_o = ABS (m - o);
/* h= Y_(l+n)^(m-o) */
h = hterm[m_p_o];
if ((m - o) < 0)
h = _sph_sym (h, m_p_o);
sum += h * _sph_sym (srcterm[o], o) * factor /
aran_spherical_seriesd_alpha (l + n, m_p_o);
}
*dstterm += conj (sum) * sign * normaliz * rpow[l + n + 1];
}
}
sign = -sign;
}
}
void
aran_spherical_seriesd_multipole_to_local_vertical
(const AranSphericalSeriesd * src,
AranSphericalSeriesd * dst,
gdouble r,
gdouble cost,
gdouble cosp, gdouble sinp)
{
gint l, m;
gint n;
gint d = dst->posdeg + src->negdeg;
gdouble rpow[d + 1];
gdouble pow, inv_r;
gcomplex128 *srcterm, *dstterm, *hterm;
gcomplex128 harmonics[((d + 1) * (d + 2)) / 2];
gcomplex128 expp = cosp + G_I * sinp;
gdouble sign;
aran_spherical_seriesd_alpha_require (d);
aran_spherical_seriesd_beta_require (d);
aran_spherical_harmonic_evaluate_multiple_internal (d, cost, 0, expp,
harmonics);
inv_r = 1. / r;
pow = 1.;
for (l = 0; l <= d; l++)
{
rpow[l] = pow;
pow *= inv_r;
}
sign = 1.;
for (l = 0; l <= dst->posdeg; l++)
{
for (m = 0; m <= l; m++)
{
dstterm = _spherical_seriesd_get_pos_term (dst, l, m);
for (n = m; n < src->negdeg; n++)
{
gdouble normaliz = aran_spherical_seriesd_beta (l + n) *
aran_spherical_seriesd_beta (l) /
aran_spherical_seriesd_beta (n);
gcomplex128 sum;
gdouble factor;
gcomplex128 h;
srcterm = _spherical_seriesd_get_neg_term (src, n, 0);
hterm = aran_spherical_harmonic_multiple_get_term (l + n, 0,
harmonics);
/* o == -m */
factor = aran_spherical_seriesd_alpha (l, m) *
aran_spherical_seriesd_alpha (n, m);
/* h= Y_(l+n)^(m+o) */
h = hterm[0];
sum = h * _sph_sym (srcterm[m], m) * factor /
aran_spherical_seriesd_alpha (l + n, 0);
*dstterm += conj (sum) * sign * normaliz * rpow[l + n + 1];
}
}
sign = -sign;
}
}
static void aran_multipole_translate (const AranSphericalSeriesd * src,
AranSphericalSeriesd * dst,
gdouble r,
gdouble cost, gdouble sint,
gdouble cosp, gdouble sinp)
{
gint l, m;
gint n, o;
gdouble rpow[dst->negdeg];
gdouble pow;
gcomplex128 *srcterm, *dstterm, *hterm;
gint d = MAX (src->negdeg, dst->negdeg) - 1;
gcomplex128 harmonics[((d + 1) * (d + 2)) / 2];
gcomplex128 expp = cosp + G_I * sinp;
if (src->negdeg > dst->negdeg)
g_warning ("could loose precision in \"%s\"\n", __PRETTY_FUNCTION__);
aran_spherical_seriesd_alpha_require (d);
aran_spherical_seriesd_beta_require (d);
aran_spherical_harmonic_evaluate_multiple_internal (dst->negdeg - 1, cost,
sint, expp, harmonics);
pow = 1.;
for (l = 0; l < dst->negdeg; l++)
{
rpow[l] = pow;
pow *= r;
for (m = 0; m <= l; m++)
{
dstterm = _spherical_seriesd_get_neg_term (dst, l, m);
for (n = 0; n <= MIN (l, src->negdeg - 1); n++)
{
gdouble normaliz = aran_spherical_seriesd_beta (l - n) *
aran_spherical_seriesd_beta (l) /
aran_spherical_seriesd_beta (n);
gcomplex128 sum = 0.;
srcterm = _spherical_seriesd_get_neg_term (src, n, 0);
hterm = aran_spherical_harmonic_multiple_get_term (l - n, 0,
harmonics);
for (o = MAX (-n, m + n - l); o <= MIN (n, l + m - n); o++)
{
guint abs_m_m_o = ABS (m - o);
gdouble factor =
aran_spherical_seriesd_alpha (l - n, abs_m_m_o) *
aran_spherical_seriesd_alpha (n, ABS (o)) /
aran_spherical_seriesd_alpha (l, ABS (m));
gcomplex128 h = conj (hterm[abs_m_m_o]);
/* h=conj ( Y_(l-n)^(m-o) ) */
if ((m - o) < 0)
h = _sph_sym (h, abs_m_m_o);
if (o >= 0)
h *= srcterm[o];
else
h *= _sph_sym (srcterm[-o], -o);
sum += h * factor;
}
*dstterm += sum * normaliz * rpow[l - n];
}
}
}
}
void
aran_spherical_seriesd_multipole_to_local_vertical
(const AranSphericalSeriesd * src,
AranSphericalSeriesd * dst,
gdouble r,
gdouble cost,
gdouble cosp, gdouble sinp)
{
gint l, m;
gint n;
gint d = dst->posdeg + src->negdeg;
gdouble rpow[d + 1];
gdouble pow, inv_r;
gcomplex128 *srcterm, *dstterm;
gdouble sign;
aran_spherical_seriesd_alpha_require (d);
aran_spherical_seriesd_beta_require (d);
inv_r = 1. / r;
pow = 1.;
for (l = 0; l <= d; l++)
{
rpow[l] = pow;
pow *= inv_r;
}
sign = 1.;
for (l = 0; l <= dst->posdeg; l++)
{
for (m = 0; m <= l; m++)
{
dstterm = _spherical_seriesd_get_pos_term (dst, l, m);
for (n = m; n < src->negdeg; n++)
{
gdouble normaliz = aran_spherical_seriesd_beta (l) /
aran_spherical_seriesd_beta (n);
gcomplex128 sum;
gdouble factor;
gcomplex128 h;
srcterm = _spherical_seriesd_get_neg_term (src, n, 0);
/* o == -m */
factor = aran_spherical_seriesd_alpha (l, m) *
aran_spherical_seriesd_alpha (n, m);
/* h= Y_(l+n)^(m+o) */
/*
* in this case, h=Y_(l+n)^0, which simplifies with "normaliz"
* removing beta(l+n)
* and then becomes h = P_(l+n)^0 = (cost)^(l+n)
*/
h = ((l+n)%2 == 0)? 1. : cost;
sum = h * _sph_sym (srcterm[m], m) * factor /
aran_spherical_seriesd_alpha (l + n, 0);
*dstterm += conj (sum) * sign * normaliz * rpow[l + n + 1];
}
}
sign = -sign;
}
}
static void aran_local_translate_vertical (const AranSphericalSeriesd * src,
AranSphericalSeriesd * dst,
gdouble r,
gdouble cost,
gdouble cosp, gdouble sinp)
{
gint l, m;
gint n;
gdouble rpow[src->posdeg + 1];
gdouble pow;
gcomplex128 *srcterm, *dstterm;
gint d = MAX (src->posdeg, dst->posdeg);
if (src->posdeg > dst->posdeg)
g_warning ("could loose precision in \"%s\"\n", __PRETTY_FUNCTION__);
aran_spherical_seriesd_beta_require (d);
aran_spherical_seriesd_alpha_require (d);
pow = 1.;
for (l = 0; l <= src->posdeg; l++)
{
rpow[l] = pow;
pow *= r;
}
for (l = 0; l <= dst->posdeg; l++)
{
for (m = 0; m <= l; m++)
{
dstterm = _spherical_seriesd_get_pos_term (dst, l, m);
for (n = l; n <= src->posdeg; n++)
{
gdouble normaliz = aran_spherical_seriesd_beta (l) /
aran_spherical_seriesd_beta (n);
gdouble factor;
gdouble h;
srcterm = _spherical_seriesd_get_pos_term (src, n, 0);
/* o-m = 0 */
factor =
aran_spherical_seriesd_alpha (n - l, 0) *
aran_spherical_seriesd_alpha (l, m) /
aran_spherical_seriesd_alpha (n, m);
/* h= Y_(n-l)^(o-m) */
/*
* in this case, h=Y_(n-l)^0, which simplifies with "normaliz"
* removing beta(n-l)
* and then becomes h = P_(n-l)^0 = (cost)^(n-l)
*/
h = ((n-l)%2 == 0)? 1. : cost;
*dstterm += h * srcterm[m] * factor * normaliz *
rpow[n - l];
}
}
}
}
static gdouble _betal_over_betan_generator (guint l, guint n, AranSquareBufferd * buf)
{
return aran_spherical_seriesd_beta (l) /
aran_spherical_seriesd_beta (n);
}
