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https://github.com/QuantumPackage/qp2.git
synced 2024-11-19 20:42:36 +01:00
improv cpx erf
This commit is contained in:
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23a242052d
commit
cd3c0cb1a9
@ -3,10 +3,10 @@ program deb_ao_2e_int
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implicit none
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call check_ao_two_e_integral_cosgtos()
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!call check_ao_two_e_integral_cosgtos()
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!call check_crint1()
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!call check_crint2()
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!call check_crint3()
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call check_crint3()
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end
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@ -26,12 +26,14 @@ subroutine check_ao_two_e_integral_cosgtos()
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acc = 0.d0
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nrm = 0.d0
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i = 11
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j = 100
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k = 74
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l = 104
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! do i = 1, ao_num
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! do k = 1, ao_num
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!i = 11
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!j = 100
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!k = 74
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!l = 104
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do i = 1, ao_num
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do k = 1, ao_num
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j = i
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l = k
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!do j = 1, ao_num
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! do l = 1, ao_num
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@ -40,17 +42,19 @@ subroutine check_ao_two_e_integral_cosgtos()
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dif = abs(tmp1 - tmp2)
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!if(dif .gt. 1d-10) then
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if(tmp1 .lt. 0.d0) then
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print*, ' error on:', i, j, k, l
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print*, tmp1, tmp2, dif
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!stop
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endif
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!endif
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acc += dif
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nrm += abs(tmp1)
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! enddo
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! enddo
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! enddo
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! enddo
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enddo
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enddo
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print *, ' acc (%) = ', dif * 100.d0 / nrm
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@ -218,7 +222,7 @@ subroutine check_crint3()
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t_int1 = 0.d0
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t_int2 = 0.d0
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n_test = 5
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n_test = 1
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acc_re = 0.d0
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nrm_re = 0.d0
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@ -249,9 +253,14 @@ subroutine check_crint3()
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n = int(x)
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!if(n.eq.0) cycle
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n = 0
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!rho = (-6.83897018210218d0, -7.24479852507338d0)
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rho = (-9.83206247355480d0, 0.445269582329036d0)
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print*, " n = ", n
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print*, " rho = ", real(rho), aimag(rho)
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call wall_time(t1)
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int1_old = crint_2(n, rho)
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!n_quad = 10000000
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@ -16,7 +16,6 @@ complex*16 function crint_1(n, rho)
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complex*16 :: sq_rho, rho_inv, rho_exp
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complex*16 :: crint_smallz, cpx_erf_1
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complex*16 :: cpx_erf_2
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rho_re = real (rho)
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rho_im = aimag(rho)
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@ -48,10 +47,6 @@ complex*16 function crint_1(n, rho)
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rho_exp = 0.5d0 * zexp(-rho)
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rho_inv = (1.d0, 0.d0) / rho
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!print*, sq_rho_re, sq_rho_im
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!print*, cpx_erf_1(sq_rho_re, sq_rho_im)
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!print*, cpx_erf_2(sq_rho_re, sq_rho_im)
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crint_1 = 0.5d0 * sqpi * cpx_erf_1(sq_rho_re, sq_rho_im) / sq_rho
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mmax = n
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if(mmax .gt. 0) then
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@ -185,7 +180,7 @@ complex*16 function crint_smallz(n, rho)
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complex*16, intent(in) :: rho
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integer, parameter :: kmax = 40
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double precision, parameter :: eps = 1.d-13
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double precision, parameter :: eps = 1.d-10
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integer :: k
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double precision :: delta_mod
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@ -208,6 +203,7 @@ complex*16 function crint_smallz(n, rho)
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if(delta_mod > eps) then
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write(*,*) ' pb in crint_smallz !'
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write(*,*) ' n, rho = ', n, rho
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write(*,*) ' value = ', crint_smallz
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write(*,*) ' delta_mod = ', delta_mod
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!stop 1
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endif
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@ -229,30 +225,94 @@ complex*16 function crint_2(n, rho)
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complex*16, external :: crint_smallz
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if(abs(rho) < 10.d0) then
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if(abs(rho) < 3.5d0) then
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if(abs(rho) .lt. 0.35d0) then
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select case(n)
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case(0)
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crint_2 = (((((((((1.3122532963802805073d-08 * rho &
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- 1.450385222315046877d-07) * rho &
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+ 1.458916900093370682d-06) * rho &
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- 0.132275132275132275d-04) * rho &
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+ 0.106837606837606838d-03) * rho &
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- 0.757575757575757576d-03) * rho &
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+ 0.462962962962962963d-02) * rho &
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- 0.238095238095238095d-01) * rho &
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+ 0.10000000000000000000d0) * rho &
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- 0.33333333333333333333d0) * rho &
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+ 1.0d0
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case(1)
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crint_2 = (((((((((1.198144314086343d-08 * rho &
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- 1.312253296380281d-07) * rho &
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+ 1.305346700083542d-06) * rho &
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- 1.167133520074696d-05) * rho &
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+ 9.259259259259259d-05) * rho &
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- 6.410256410256410d-04) * rho &
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+ 3.787878787878788d-03) * rho &
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- 1.851851851851852d-02) * rho &
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+ 7.142857142857142d-02) * rho &
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- 2.000000000000000d-01) * rho &
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+ 3.333333333333333d-01
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case(2)
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crint_2 = (((((((((1.102292768959436d-08 * rho &
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- 1.198144314086343d-07) * rho &
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+ 1.181027966742252d-06) * rho &
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- 1.044277360066834d-05) * rho &
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+ 8.169934640522875d-05) * rho &
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- 5.555555555555556d-04) * rho &
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+ 3.205128205128205d-03) * rho &
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- 1.515151515151515d-02) * rho &
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+ 5.555555555555555d-02) * rho &
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- 1.428571428571428d-01) * rho &
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+ 2.000000000000000d-01
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case(3)
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crint_2 = (((((((((1.020641452740218d-08 * rho &
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- 1.102292768959436d-07) * rho &
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+ 1.078329882677709d-06) * rho &
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- 9.448223733938020d-06) * rho &
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+ 7.309941520467836d-05) * rho &
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- 4.901960784313725d-04) * rho &
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+ 2.777777777777778d-03) * rho &
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- 1.282051282051282d-02) * rho &
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+ 4.545454545454546d-02) * rho &
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- 1.111111111111111d-01) * rho &
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+ 1.428571428571428d-01
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case default
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tmp = dble(n + n + 1)
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crint_2 = (((((((((2.755731922398589d-07 * rho / (tmp + 20.d0) &
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- 2.755731922398589d-06 / (tmp + 18.d0)) * rho &
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+ 2.480158730158730d-05 / (tmp + 16.d0)) * rho &
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- 1.984126984126984d-04 / (tmp + 14.d0)) * rho &
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+ 1.388888888888889d-03 / (tmp + 12.d0)) * rho &
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- 8.333333333333333d-03 / (tmp + 10.d0)) * rho &
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+ 4.166666666666666d-02 / (tmp + 8.d0)) * rho &
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- 1.666666666666667d-01 / (tmp + 6.d0)) * rho &
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+ 5.000000000000000d-01 / (tmp + 4.d0)) * rho &
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- 1.000000000000000d+00 / (tmp + 2.d0)) * rho &
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+ 1.0d0 / tmp
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end select
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if(abs(rho) .lt. 1d-6) then
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tmp = dble(n + n)
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rho2 = rho * rho
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crint_2 = - 0.16666666666666666d0 * rho * rho2 / (tmp + 7.d0) &
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+ 0.5d0 * rho2 / (tmp + 5.d0) &
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- rho / (tmp + 3.d0) &
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+ 1.d0 / (tmp + 1.d0)
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else
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crint_2 = crint_smallz(n, rho)
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endif
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else
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if(real(rho) .ge. 0.d0) then
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call zboysfun(n, rho, vals)
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crint_2 = vals(n)
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else
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call zboysfunnrp(n, rho, vals)
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crint_2 = vals(n) * zexp(-rho)
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endif
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endif
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endif
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return
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end
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@ -380,30 +440,83 @@ subroutine crint_2_vec(n_max, rho, vals)
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abs_rho = abs(rho)
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if(abs_rho < 10.d0) then
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if(abs_rho < 3.5d0) then
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if(abs_rho .lt. 1d-6) then
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if(abs_rho .lt. 0.35d0) then
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! use finite expansion for very small rho
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vals(0) = (((((((((1.3122532963802805073d-08 * rho &
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- 1.450385222315046877d-07) * rho &
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+ 1.458916900093370682d-06) * rho &
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- 0.132275132275132275d-04) * rho &
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+ 0.106837606837606838d-03) * rho &
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- 0.757575757575757576d-03) * rho &
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+ 0.462962962962962963d-02) * rho &
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- 0.238095238095238095d-01) * rho &
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+ 0.10000000000000000000d0) * rho &
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- 0.33333333333333333333d0) * rho &
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+ 1.0d0
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!! rho^2 / 2
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!rho2 = 0.5d0 * rho * rho
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!! rho^3 / 6
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!rho3 = 0.3333333333333333d0 * rho * rho2
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!vals(0) = 1.d0 - 0.3333333333333333d0 * rho + 0.2d0 * rho2 - 0.14285714285714285d0 * rho3
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!do n = 1, n_max
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! tmp = 2.d0 * dble(n)
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! vals(n) = 1.d0 / (tmp + 1.d0) - rho / (tmp + 3.d0) &
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! + rho2 / (tmp + 5.d0) - rho3 / (tmp + 7.d0)
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!enddo
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if(n > 0) then
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! TODO (last term)
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vals(0) = 1.d0 + rho * (-0.3333333333333333d0 + rho*(0.1d0 - 0.047619047619047616d0*rho))
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do n = 1, n_max
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tmp = 2.d0 * dble(n)
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vals(n) = 1.d0 / (tmp + 1.d0) + rho * (-1.d0/(tmp+3.d0) + rho*(0.5d0/(tmp+5.d0) - 0.3333333333333333d0*rho/(tmp+7.d0)))
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vals(1) = (((((((((1.198144314086343d-08 * rho &
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- 1.312253296380281d-07) * rho &
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+ 1.305346700083542d-06) * rho &
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- 1.167133520074696d-05) * rho &
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+ 9.259259259259259d-05) * rho &
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- 6.410256410256410d-04) * rho &
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+ 3.787878787878788d-03) * rho &
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- 1.851851851851852d-02) * rho &
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+ 7.142857142857142d-02) * rho &
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- 2.000000000000000d-01) * rho &
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+ 3.333333333333333d-01
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if(n > 1) then
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vals(2) = (((((((((1.102292768959436d-08 * rho &
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- 1.198144314086343d-07) * rho &
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+ 1.181027966742252d-06) * rho &
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- 1.044277360066834d-05) * rho &
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+ 8.169934640522875d-05) * rho &
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- 5.555555555555556d-04) * rho &
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+ 3.205128205128205d-03) * rho &
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- 1.515151515151515d-02) * rho &
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+ 5.555555555555555d-02) * rho &
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- 1.428571428571428d-01) * rho &
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+ 2.000000000000000d-01
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if(n > 2) then
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vals(3) = (((((((((1.020641452740218d-08 * rho &
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- 1.102292768959436d-07) * rho &
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+ 1.078329882677709d-06) * rho &
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- 9.448223733938020d-06) * rho &
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+ 7.309941520467836d-05) * rho &
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- 4.901960784313725d-04) * rho &
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+ 2.777777777777778d-03) * rho &
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- 1.282051282051282d-02) * rho &
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+ 4.545454545454546d-02) * rho &
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- 1.111111111111111d-01) * rho &
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+ 1.428571428571428d-01
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do n = 4, n_max
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tmp = dble(n + n + 1)
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vals(n) = (((((((((2.755731922398589d-07 * rho / (tmp + 20.d0) &
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- 2.755731922398589d-06 / (tmp + 18.d0)) * rho &
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+ 2.480158730158730d-05 / (tmp + 16.d0)) * rho &
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- 1.984126984126984d-04 / (tmp + 14.d0)) * rho &
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+ 1.388888888888889d-03 / (tmp + 12.d0)) * rho &
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- 8.333333333333333d-03 / (tmp + 10.d0)) * rho &
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+ 4.166666666666666d-02 / (tmp + 8.d0)) * rho &
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- 1.666666666666667d-01 / (tmp + 6.d0)) * rho &
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+ 5.000000000000000d-01 / (tmp + 4.d0)) * rho &
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- 1.000000000000000d+00 / (tmp + 2.d0)) * rho &
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+ 1.0d0 / tmp
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enddo
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endif ! n > 2
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endif ! n > 1
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endif ! n > 0
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else
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call crint_smallz_vec(n_max, rho, vals)
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@ -445,7 +558,7 @@ subroutine crint_smallz_vec(n_max, rho, vals)
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complex*16, intent(out) :: vals(0:n_max)
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integer, parameter :: kmax = 40
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double precision, parameter :: eps = 1.d-13
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double precision, parameter :: eps = 1.d-10
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integer :: k, n
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complex*16 :: ct, delta_k
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@ -475,11 +588,12 @@ subroutine crint_smallz_vec(n_max, rho, vals)
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endif
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enddo
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!if(abs(delta_k) > eps) then
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! write(*,*) ' pb in crint_smallz_vec !'
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! write(*,*) ' n, rho = ', n, rho
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! write(*,*) ' |delta_k| = ', abs(delta_k)
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!endif
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if(abs(delta_k) > eps) then
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write(*,*) ' pb in crint_smallz_vec !'
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write(*,*) ' n, rho = ', n, rho
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write(*,*) ' value = ', vals(n)
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write(*,*) ' |delta_k| = ', abs(delta_k)
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endif
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enddo
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deallocate(rho_k)
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@ -201,49 +201,6 @@ end
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! ---
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complex*16 function cpx_erf_2(x, y)
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BEGIN_DOC
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!
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! compute erf(z) for z = x + i y
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!
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! Beylkin & Sharma, J. Chem. Phys. 155, 174117 (2021)
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! https://doi.org/10.1063/5.0062444
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!
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END_DOC
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implicit none
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double precision, intent(in) :: x, y
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double precision :: yabs
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complex*16 :: z
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yabs = dabs(y)
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if(yabs .lt. 1.d-15) then
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cpx_erf_2 = (1.d0, 0.d0) * derf(x)
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return
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else
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z = x + (0.d0, 1.d0) * y
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if(x .ge. 0.d0) then
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call zboysfun00(z, cpx_erf_2)
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else
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call zboysfun00nrp(z, cpx_erf_2)
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cpx_erf_2 = cpx_erf_2 * zexp(-z)
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endif
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endif
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return
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end
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! ---
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subroutine zboysfun00(z, val)
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BEGIN_DOC
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@ -333,20 +290,18 @@ subroutine zboysfun00(z, val)
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complex*16, intent(out) :: val
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integer :: k
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complex*16 :: z1, zz, y
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zz = zexp(-z)
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complex*16 :: z1, y
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if(abs(z) .ge. 100.0d0) then
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! large |z|
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z1 = (1.0d0, 0.d0) / zsqrt(z)
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y = (1.0d0, 0.d0) / z
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z1 = (1.d0, 0.d0) / zsqrt(z)
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||||
y = (1.d0, 0.d0) / z
|
||||
val = asymcoef(7)
|
||||
do k = 6, 1, -1
|
||||
val = val * y + asymcoef(k)
|
||||
enddo
|
||||
val = zz * val * y + z1 * sqpio2
|
||||
val = zexp(-z) * val * y + z1 * sqpio2
|
||||
|
||||
else if(abs(z) .le. 0.35d0) then
|
||||
|
||||
@ -359,12 +314,7 @@ subroutine zboysfun00(z, val)
|
||||
else
|
||||
|
||||
! intermediate |z|
|
||||
val = sqpio2 / zsqrt(z) - 0.5d0 * zz * sum(ff(1:22)/(z+pp(1:22)))
|
||||
!val = (0.d0, 0.d0)
|
||||
!do k = 1, 22
|
||||
! val += ff(k) / (z + pp(k))
|
||||
!enddo
|
||||
!val = sqpio2 / zsqrt(z) - 0.5d0 * zz * val
|
||||
val = sqpio2 / zsqrt(z) - 0.5d0 * zexp(-z) * sum(ff(1:22)/(z+pp(1:22)))
|
||||
|
||||
endif
|
||||
|
||||
@ -533,8 +483,8 @@ subroutine zboysfun00nrp(z, val)
|
||||
|
||||
if(abs(z) .ge. 100.0d0) then
|
||||
! large |z|
|
||||
z1 = (1.0d0, 0.d0) / zsqrt(z)
|
||||
y = (1.0d0, 0.d0) / z
|
||||
z1 = (1.d0, 0.d0) / zsqrt(z)
|
||||
y = (1.d0, 0.d0) / z
|
||||
val = asymcoef(7)
|
||||
do k = 6, 1, -1
|
||||
val = val * y + asymcoef(k)
|
||||
|
Loading…
Reference in New Issue
Block a user