mirror of
https://github.com/QuantumPackage/qp2.git
synced 2024-11-15 18:43:51 +01:00
410 lines
12 KiB
Fortran
410 lines
12 KiB
Fortran
! ---
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!______________________________________________________________________________________________________________________
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!______________________________________________________________________________________________________________________
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double precision function general_primitive_integral_coul_shifted( dim &
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, P_new, P_center, fact_p, p, p_inv, iorder_p, shift_P &
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, Q_new, Q_center, fact_q, q, q_inv, iorder_q, shift_Q )
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include 'utils/constants.include.F'
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implicit none
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integer, intent(in) :: dim
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integer, intent(in) :: iorder_p(3), shift_P(3)
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integer, intent(in) :: iorder_q(3), shift_Q(3)
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double precision, intent(in) :: P_new(0:max_dim,3), P_center(3), fact_p, p, p_inv
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double precision, intent(in) :: Q_new(0:max_dim,3), Q_center(3), fact_q, q, q_inv
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integer :: n_Ix, n_Iy, n_Iz, nx, ny, nz
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integer :: ix, iy, iz, jx, jy, jz, i
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integer :: n_pt_tmp, n_pt_out, iorder
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integer :: ii, jj
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double precision :: rho, dist
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double precision :: dx(0:max_dim), Ix_pol(0:max_dim)
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double precision :: dy(0:max_dim), Iy_pol(0:max_dim)
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double precision :: dz(0:max_dim), Iz_pol(0:max_dim)
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double precision :: a, b, c, d, e, f, accu, pq, const
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double precision :: pq_inv, p10_1, p10_2, p01_1, p01_2, pq_inv_2
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double precision :: d1(0:max_dim), d_poly(0:max_dim)
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double precision :: p_plus_q
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double precision :: rint_sum
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general_primitive_integral_coul_shifted = 0.d0
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!DIR$ ATTRIBUTES ALIGN : $IRP_ALIGN :: dx, Ix_pol, dy, Iy_pol, dz, Iz_pol
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!DIR$ ATTRIBUTES ALIGN : $IRP_ALIGN :: d1, d_poly
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! Gaussian Product
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! ----------------
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p_plus_q = (p+q)
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pq = p_inv * 0.5d0 * q_inv
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pq_inv = 0.5d0 / p_plus_q
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p10_1 = q * pq ! 1/(2p)
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p01_1 = p * pq ! 1/(2q)
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pq_inv_2 = pq_inv + pq_inv
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p10_2 = pq_inv_2 * p10_1 * q ! 0.5d0 * q / (pq + p*p)
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p01_2 = pq_inv_2 * p01_1 * p ! 0.5d0 * p / (q*q + pq)
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accu = 0.d0
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iorder = iorder_p(1) + iorder_q(1) + iorder_p(1) + iorder_q(1)
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iorder = iorder + shift_P(1) + shift_Q(1)
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iorder = iorder + shift_P(1) + shift_Q(1)
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!DIR$ VECTOR ALIGNED
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do ix = 0, iorder
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Ix_pol(ix) = 0.d0
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enddo
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n_Ix = 0
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do ix = 0, iorder_p(1)
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ii = ix + shift_P(1)
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a = P_new(ix,1)
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if(abs(a) < thresh) cycle
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do jx = 0, iorder_q(1)
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jj = jx + shift_Q(1)
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d = a * Q_new(jx,1)
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if(abs(d) < thresh) cycle
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!DEC$ FORCEINLINE
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call give_polynom_mult_center_x( P_center(1), Q_center(1), ii, jj &
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, p, q, iorder, pq_inv, pq_inv_2, p10_1, p01_1, p10_2, p01_2, dx, nx )
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!DEC$ FORCEINLINE
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call add_poly_multiply(dx, nx, d, Ix_pol, n_Ix)
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enddo
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enddo
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if(n_Ix == -1) then
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return
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endif
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iorder = iorder_p(2) + iorder_q(2) + iorder_p(2) + iorder_q(2)
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iorder = iorder + shift_P(2) + shift_Q(2)
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iorder = iorder + shift_P(2) + shift_Q(2)
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!DIR$ VECTOR ALIGNED
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do ix = 0, iorder
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Iy_pol(ix) = 0.d0
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enddo
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n_Iy = 0
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do iy = 0, iorder_p(2)
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if(abs(P_new(iy,2)) > thresh) then
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ii = iy + shift_P(2)
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b = P_new(iy,2)
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do jy = 0, iorder_q(2)
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jj = jy + shift_Q(2)
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e = b * Q_new(jy,2)
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if(abs(e) < thresh) cycle
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!DEC$ FORCEINLINE
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call give_polynom_mult_center_x( P_center(2), Q_center(2), ii, jj &
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, p, q, iorder, pq_inv, pq_inv_2, p10_1, p01_1, p10_2, p01_2, dy, ny )
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!DEC$ FORCEINLINE
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call add_poly_multiply(dy, ny, e, Iy_pol, n_Iy)
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enddo
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endif
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enddo
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if(n_Iy == -1) then
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return
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endif
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iorder = iorder_p(3) + iorder_q(3) + iorder_p(3) + iorder_q(3)
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iorder = iorder + shift_P(3) + shift_Q(3)
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iorder = iorder + shift_P(3) + shift_Q(3)
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do ix = 0, iorder
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Iz_pol(ix) = 0.d0
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enddo
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n_Iz = 0
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do iz = 0, iorder_p(3)
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if( abs(P_new(iz,3)) > thresh ) then
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ii = iz + shift_P(3)
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c = P_new(iz,3)
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do jz = 0, iorder_q(3)
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jj = jz + shift_Q(3)
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f = c * Q_new(jz,3)
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if(abs(f) < thresh) cycle
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!DEC$ FORCEINLINE
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call give_polynom_mult_center_x( P_center(3), Q_center(3), ii, jj &
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, p, q, iorder, pq_inv, pq_inv_2, p10_1, p01_1, p10_2, p01_2, dz, nz )
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!DEC$ FORCEINLINE
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call add_poly_multiply(dz, nz, f, Iz_pol, n_Iz)
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enddo
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endif
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enddo
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if(n_Iz == -1) then
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return
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endif
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rho = p * q * pq_inv_2
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dist = (P_center(1) - Q_center(1)) * (P_center(1) - Q_center(1)) &
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+ (P_center(2) - Q_center(2)) * (P_center(2) - Q_center(2)) &
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+ (P_center(3) - Q_center(3)) * (P_center(3) - Q_center(3))
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const = dist*rho
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n_pt_tmp = n_Ix + n_Iy
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do i = 0, n_pt_tmp
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d_poly(i) = 0.d0
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enddo
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!DEC$ FORCEINLINE
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call multiply_poly(Ix_pol, n_Ix, Iy_pol, n_Iy, d_poly, n_pt_tmp)
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if(n_pt_tmp == -1) then
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return
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endif
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n_pt_out = n_pt_tmp + n_Iz
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do i = 0, n_pt_out
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d1(i) = 0.d0
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enddo
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!DEC$ FORCEINLINE
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call multiply_poly(d_poly, n_pt_tmp, Iz_pol, n_Iz, d1, n_pt_out)
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accu = accu + rint_sum(n_pt_out, const, d1)
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general_primitive_integral_coul_shifted = fact_p * fact_q * accu * pi_5_2 * p_inv * q_inv / dsqrt(p_plus_q)
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return
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end
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!______________________________________________________________________________________________________________________
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!______________________________________________________________________________________________________________________
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!______________________________________________________________________________________________________________________
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!______________________________________________________________________________________________________________________
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double precision function general_primitive_integral_erf_shifted( dim &
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, P_new, P_center, fact_p, p, p_inv, iorder_p, shift_P &
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, Q_new, Q_center, fact_q, q, q_inv, iorder_q, shift_Q )
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include 'utils/constants.include.F'
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implicit none
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integer, intent(in) :: dim
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integer, intent(in) :: iorder_p(3), shift_P(3)
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integer, intent(in) :: iorder_q(3), shift_Q(3)
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double precision, intent(in) :: P_new(0:max_dim,3), P_center(3), fact_p, p, p_inv
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double precision, intent(in) :: Q_new(0:max_dim,3), Q_center(3), fact_q, q, q_inv
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integer :: n_Ix, n_Iy, n_Iz, nx, ny, nz
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integer :: ix, iy, iz, jx, jy, jz, i
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integer :: n_pt_tmp, n_pt_out, iorder
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integer :: ii, jj
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double precision :: rho, dist
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double precision :: dx(0:max_dim), Ix_pol(0:max_dim)
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double precision :: dy(0:max_dim), Iy_pol(0:max_dim)
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double precision :: dz(0:max_dim), Iz_pol(0:max_dim)
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double precision :: a, b, c, d, e, f, accu, pq, const
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double precision :: pq_inv, p10_1, p10_2, p01_1, p01_2, pq_inv_2
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double precision :: d1(0:max_dim), d_poly(0:max_dim)
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double precision :: p_plus_q
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double precision :: rint_sum
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general_primitive_integral_erf_shifted = 0.d0
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!DIR$ ATTRIBUTES ALIGN : $IRP_ALIGN :: dx, Ix_pol, dy, Iy_pol, dz, Iz_pol
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!DIR$ ATTRIBUTES ALIGN : $IRP_ALIGN :: d1, d_poly
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! Gaussian Product
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! ----------------
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p_plus_q = (p+q) * ( (p*q)/(p+q) + mu_erf*mu_erf ) / (mu_erf*mu_erf)
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pq = p_inv * 0.5d0 * q_inv
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pq_inv = 0.5d0 / p_plus_q
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p10_1 = q * pq ! 1/(2p)
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p01_1 = p * pq ! 1/(2q)
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pq_inv_2 = pq_inv + pq_inv
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p10_2 = pq_inv_2 * p10_1 * q ! 0.5d0 * q / (pq + p*p)
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p01_2 = pq_inv_2 * p01_1 * p ! 0.5d0 * p / (q*q + pq)
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accu = 0.d0
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iorder = iorder_p(1) + iorder_q(1) + iorder_p(1) + iorder_q(1)
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iorder = iorder + shift_P(1) + shift_Q(1)
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iorder = iorder + shift_P(1) + shift_Q(1)
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!DIR$ VECTOR ALIGNED
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do ix = 0, iorder
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Ix_pol(ix) = 0.d0
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enddo
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n_Ix = 0
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do ix = 0, iorder_p(1)
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ii = ix + shift_P(1)
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a = P_new(ix,1)
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if(abs(a) < thresh) cycle
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do jx = 0, iorder_q(1)
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jj = jx + shift_Q(1)
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d = a * Q_new(jx,1)
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if(abs(d) < thresh) cycle
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!DEC$ FORCEINLINE
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call give_polynom_mult_center_x( P_center(1), Q_center(1), ii, jj &
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, p, q, iorder, pq_inv, pq_inv_2, p10_1, p01_1, p10_2, p01_2, dx, nx )
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!DEC$ FORCEINLINE
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call add_poly_multiply(dx, nx, d, Ix_pol, n_Ix)
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enddo
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enddo
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if(n_Ix == -1) then
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return
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endif
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iorder = iorder_p(2) + iorder_q(2) + iorder_p(2) + iorder_q(2)
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iorder = iorder + shift_P(2) + shift_Q(2)
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iorder = iorder + shift_P(2) + shift_Q(2)
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!DIR$ VECTOR ALIGNED
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do ix = 0, iorder
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Iy_pol(ix) = 0.d0
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enddo
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n_Iy = 0
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do iy = 0, iorder_p(2)
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if(abs(P_new(iy,2)) > thresh) then
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ii = iy + shift_P(2)
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b = P_new(iy,2)
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do jy = 0, iorder_q(2)
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jj = jy + shift_Q(2)
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e = b * Q_new(jy,2)
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if(abs(e) < thresh) cycle
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!DEC$ FORCEINLINE
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call give_polynom_mult_center_x( P_center(2), Q_center(2), ii, jj &
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, p, q, iorder, pq_inv, pq_inv_2, p10_1, p01_1, p10_2, p01_2, dy, ny )
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!DEC$ FORCEINLINE
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call add_poly_multiply(dy, ny, e, Iy_pol, n_Iy)
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enddo
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endif
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enddo
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if(n_Iy == -1) then
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return
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endif
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iorder = iorder_p(3) + iorder_q(3) + iorder_p(3) + iorder_q(3)
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iorder = iorder + shift_P(3) + shift_Q(3)
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iorder = iorder + shift_P(3) + shift_Q(3)
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do ix = 0, iorder
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Iz_pol(ix) = 0.d0
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enddo
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n_Iz = 0
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do iz = 0, iorder_p(3)
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if( abs(P_new(iz,3)) > thresh ) then
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ii = iz + shift_P(3)
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c = P_new(iz,3)
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do jz = 0, iorder_q(3)
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jj = jz + shift_Q(3)
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f = c * Q_new(jz,3)
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if(abs(f) < thresh) cycle
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!DEC$ FORCEINLINE
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call give_polynom_mult_center_x( P_center(3), Q_center(3), ii, jj &
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, p, q, iorder, pq_inv, pq_inv_2, p10_1, p01_1, p10_2, p01_2, dz, nz )
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!DEC$ FORCEINLINE
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call add_poly_multiply(dz, nz, f, Iz_pol, n_Iz)
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enddo
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endif
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enddo
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if(n_Iz == -1) then
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return
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endif
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rho = p * q * pq_inv_2
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dist = (P_center(1) - Q_center(1)) * (P_center(1) - Q_center(1)) &
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+ (P_center(2) - Q_center(2)) * (P_center(2) - Q_center(2)) &
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+ (P_center(3) - Q_center(3)) * (P_center(3) - Q_center(3))
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const = dist*rho
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n_pt_tmp = n_Ix + n_Iy
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do i = 0, n_pt_tmp
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d_poly(i) = 0.d0
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enddo
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!DEC$ FORCEINLINE
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call multiply_poly(Ix_pol, n_Ix, Iy_pol, n_Iy, d_poly, n_pt_tmp)
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if(n_pt_tmp == -1) then
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return
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endif
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n_pt_out = n_pt_tmp + n_Iz
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do i = 0, n_pt_out
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d1(i) = 0.d0
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enddo
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!DEC$ FORCEINLINE
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call multiply_poly(d_poly, n_pt_tmp, Iz_pol, n_Iz, d1, n_pt_out)
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accu = accu + rint_sum(n_pt_out, const, d1)
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general_primitive_integral_erf_shifted = fact_p * fact_q * accu * pi_5_2 * p_inv * q_inv / dsqrt(p_plus_q)
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return
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end
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!______________________________________________________________________________________________________________________
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!______________________________________________________________________________________________________________________
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! ---
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subroutine inv_r_times_poly(r, dist_r, dist_vec, poly)
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BEGIN_DOC
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!
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! returns
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!
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! poly(1) = x / sqrt(x^2+y^2+z^2), poly(2) = y / sqrt(x^2+y^2+z^2), poly(3) = z / sqrt(x^2+y^2+z^2)
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!
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! with the arguments
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!
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! r(1) = x, r(2) = y, r(3) = z, dist_r = sqrt(x^2+y^2+z^2)
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!
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! dist_vec(1) = sqrt(y^2+z^2), dist_vec(2) = sqrt(x^2+z^2), dist_vec(3) = sqrt(x^2+y^2)
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!
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END_DOC
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implicit none
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double precision, intent(in) :: r(3), dist_r, dist_vec(3)
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double precision, intent(out) :: poly(3)
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integer :: i
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double precision :: inv_dist
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if (dist_r .gt. 1.d-8)then
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inv_dist = 1.d0/dist_r
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do i = 1, 3
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poly(i) = r(i) * inv_dist
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enddo
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else
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do i = 1, 3
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if(dabs(r(i)).lt.dist_vec(i)) then
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inv_dist = 1.d0/dist_r
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poly(i) = r(i) * inv_dist
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else
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poly(i) = 1.d0
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endif
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enddo
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endif
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end
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! ---
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