ttim.besselnumbanew#

Attributes#

tiny

c

fac

nrange

a

b

fac

b

a

gam

binom

fac

bot

fac

psi

psi

a1

b1

twologhalf

Functions#

lapld_int_ho(x, y, z1, z2, order)

lapld_int_ho.

lapld_int_ho_d1d2(x, y, z1, z2, order, d1, d2)

lapld_int_ho_d1d2.

lapld_int_ho_wdis(x, y, z1, z2, order)

lapld_int_ho_wdis.

lapld_int_ho_wdis_d1d2(x, y, z1, z2, order, d1, d2)

lapld_int_ho_wdis_d1d2.

Fp(x, y, z1, z2, biga, order, d1, d2, a, b, nt)

bessells_int_ho_new(x, y, z1, z2, lab, order, d1, d2)

Docs.

bessells_int_ho_qxqy_new(x, y, z1, z2, lab, order, d1, d2)

Docs.

besselld_int_ho_new(x, y, z1, z2, lab, order, d1, d2)

Docs.

besselld_int_ho_qxqy_new(x, y, z1, z2, lab, order, d1, d2)

Docs.

Module Contents#

ttim.besselnumbanew.tiny = 1e-10#
ttim.besselnumbanew.c#
ttim.besselnumbanew.fac = 1.0#
ttim.besselnumbanew.nrange#
ttim.besselnumbanew.a#
ttim.besselnumbanew.b#
ttim.besselnumbanew.fac#
ttim.besselnumbanew.b#
ttim.besselnumbanew.a#
ttim.besselnumbanew.gam#
ttim.besselnumbanew.binom#
ttim.besselnumbanew.fac = 1.0#
ttim.besselnumbanew.bot#
ttim.besselnumbanew.fac#
ttim.besselnumbanew.psi#
ttim.besselnumbanew.psi#
ttim.besselnumbanew.a1#
ttim.besselnumbanew.b1#
ttim.besselnumbanew.twologhalf#
ttim.besselnumbanew.lapld_int_ho(x, y, z1, z2, order)[source]#

lapld_int_ho.

! Near field only implicit none integer, intent(in) :: order real(kind=8), intent(in) :: x,y complex(kind=8), intent(in) :: z1,z2 complex(kind=8), dimension(0:order) :: omega, qm integer :: m, n real(kind=8) :: L complex(kind=8) :: z, zplus1, zmin1

ttim.besselnumbanew.lapld_int_ho_d1d2(x, y, z1, z2, order, d1, d2)[source]#

lapld_int_ho_d1d2.

Near field only Returns integral from d1 to d2 along real axis while strength is still Delta^order from -1 to +1 implicit none integer, intent(in) :: order real(kind=8), intent(in) :: x,y,d1,d2 complex(kind=8), intent(in) :: z1,z2 complex(kind=8), dimension(0:order) :: omega, omegac integer :: n, m real(kind=8) :: xp, yp, dc, fac complex(kind=8) :: z1p,z2p,bigz1,bigz2

ttim.besselnumbanew.lapld_int_ho_wdis(x, y, z1, z2, order)[source]#

lapld_int_ho_wdis.

# Near field only implicit none integer, intent(in) :: order real(kind=8), intent(in) :: x,y complex(kind=8), intent(in) :: z1,z2 complex(kind=8), dimension(0:order) :: wdis complex(kind=8), dimension(0:10) :: qm # Max order is 10 integer :: m, n complex(kind=8) :: z, zplus1, zmin1, term1, term2, zterm

ttim.besselnumbanew.lapld_int_ho_wdis_d1d2(x, y, z1, z2, order, d1, d2)[source]#

lapld_int_ho_wdis_d1d2.

# Near field only # Returns integral from d1 to d2 along real axis while strength is still # Delta^order from -1 to +1 implicit none integer, intent(in) :: order real(kind=8), intent(in) :: x,y,d1,d2 complex(kind=8), intent(in) :: z1,z2 complex(kind=8), dimension(0:order) :: wdis, wdisc integer :: n, m real(kind=8) :: xp, yp, dc, fac complex(kind=8) :: z1p,z2p,bigz1,bigz2

ttim.besselnumbanew.Fp(x, y, z1, z2, biga, order, d1, d2, a, b, nt)[source]#
ttim.besselnumbanew.bessells_int_ho_new(x, y, z1, z2, lab, order, d1, d2, nt=20)[source]#

Docs.

To come here

ttim.besselnumbanew.bessells_int_ho_qxqy_new(x, y, z1, z2, lab, order, d1, d2)[source]#

Docs.

To come here

ttim.besselnumbanew.besselld_int_ho_new(x, y, z1, z2, lab, order, d1, d2)[source]#

Docs.

To come here

ttim.besselnumbanew.besselld_int_ho_qxqy_new(x, y, z1, z2, lab, order, d1, d2)[source]#

Docs.

To come here