cc_project_test
cc_project_test,
is a MATLAB program which
calls cc_project() to investigate the extension of a ClenshawCurtislike quadrature
scheme to semiinfinite and infinite intervals, and to integrands
with a specified density function.
Licensing:
The computer code and data files made available on this web page
are distributed under
the GNU LGPL license.
Related Data and Programs:
cc_project,
a MATLAB library which
investigates generalized ClenshawCurtis quadrature rules
for semiinfinite and infinite intervals, by John Boyd.
Source Code:

cc_project_test.m,
calls all the tests;

cc_project_test.sh,
runs all the tests;

cc_project_test.txt,
the output file.

cardinal_cos_test.m,
plots a cardinal cosine interpolant basis function.

cardinal_cos.png,
a plot of a cardinal cosine interpolant basis function.

cardinal_sin_test.m,
plots a cardinal sine interpolant basis function.

cardinal_sin.png,
a plot of a cardinal sine interpolant basis function.

cardinal_test.m,
checks the Lagrange property for the cardinal cosine and sine
families.

ccff_asymptotic_test.m,
tests ccff_asymptotic() for a specific integrand.

ccff_exactness_test.m

ccff_tabulate_test.m,
tabulates CCFF quadrature rules for the Legendre integral.

ccfi_0_asymptotic_test.m,

ccfi_0_exactness_test.m

ccfi_0_tabulate_test.m,
tabulates CCFI_0 quadrature rules for the Laguerre integral
with density exp(x).

ccfi_1_asymptotic_test.m,

ccfi_1_exactness_test.m

ccfi_1_tabulate_test.m,
tabulates CCFI_1 quadrature rules for the Laguerre integral
with density 1.

ccii_0_tabulate_test.m,
tabulates CCII_0 quadrature rules for the Hermite integral
with density exp(x^2).

ccii_1_tabulate_test.m,
tabulates CCII_1 quadrature rules for the Hermite integral
with density 1.

ccii_asymptotic_test.m,

compare_ff_test.m,
prints out the order 5 version of Boyd's ClenshawCurtis type
rule for the Legendre integral, comparing it with several other
rules.

laguerre_exactness.m,
tests a quadrature rule for exactness on the Laguerre integral.

legendre_exactness.m,
tests a quadrature rule for exactness on the Legendre integral.
Last modified on 11 December 2018.