CWPLD
This function evaluates the first derivative of the Weierstrass’ ℘ function in the lemniscatic case for complex argument with unit period parallelogram.
Function Return Value
CWPLD — Complex function value. (Output)
Required Arguments
Z — Complex argument for which the function value is desired. (Input)
FORTRAN 90 Interface
Generic: CWPLD (Z)
Specific: The specific interface names are C_CWPLD and Z_CWPLD.
FORTRAN 77 Interface
Complex: CWPLD (Z)
Double complex: The double complex name is ZWPLD.
Description
The Weierstrass’
℘ function,
℘(
z) =
℘(
z ∣ ω,
ωʹ), is an elliptic function of order two with periods 2
ω and 2
ωʹ and a double pole at
z = 0.
CWPLD(
Z) computes the derivative of
℘(
z ∣ ω,
ωʹ) with 2
ω = 1 and 2
ωʹ =
i.
CWPL computes
℘(
z ∣ ω,
ωʹ).
The input argument is first reduced to the fundamental parallelogram of all z satisfying –1/2 ≤ ℜz ≤ 1/2 and –1/2 ≤ ℑz ≤ 1/2. Then, a rational approximation is used.
All arguments are valid with the exception of the lattice points z = m + ni, which are the poles of CWPL. If the argument is a lattice point, then b = AMACH(2), the largest floating‑point number, is returned.
Function CWPLD is based on code by Eckhardt (1980). Also, see Eckhardt (1977).
Example
In this example, ℘(0.25 + 0.25i) is computed and printed.
USE CWPLD_INT
USE UMACH_INT
IMPLICIT NONE
! Declare variables
INTEGER NOUT
COMPLEX VALUE, Z
! Compute
Z = (0.25, 0.25)
VALUE = CWPLD(Z)
! Print the results
CALL UMACH (2, NOUT)
WRITE (NOUT,99999) Z, VALUE
99999 FORMAT (' CWPLD(', F6.3, ',', F6.3, ') = (', &
F6.3, ',', F6.3, ')')
END
Output
CWPLD( 0.250, 0.250) = (36.054,36.054)
Published date: 03/19/2020
Last modified date: 03/19/2020