test_interp_1d, a FORTRAN77 code which defines test functions y(x) that may be used to test interpolation algorithms involving a 1D argument x.
The computer code and data files described and made available on this web page are distributed under the GNU LGPL license.
test_interp_1d is available in a C version and a C++ version and a Fortran90 version and a MATLAB version and an Octave version and a Python version.
barycentric_interp_1d, a FORTRAN77 library which defines and evaluates the barycentric Lagrange polynomial p(x) which interpolates a set of data, so that p(x(i)) = y(i). The barycentric approach means that very high degree polynomials can safely be used.
bernstein_polynomial, a FORTRAN77 library which evaluates the Bernstein polynomials, useful for uniform approximation of functions;
CHEBYSHEV_INTERP_1D, a FORTRAN77 library which determines the combination of Chebyshev polynomials which interpolates a set of data, so that p(x(i)) = y(i).
LAGRANGE_INTERP_1D, a FORTRAN77 library which defines and evaluates the Lagrange polynomial p(x) which interpolates a set of data, so that p(x(i)) = y(i).
NEAREST_INTERP_1D, a FORTRAN77 library which interpolates a set of data using a piecewise constant interpolant defined by the nearest neighbor criterion.
PWL_INTERP_1D, a FORTRAN77 library which interpolates a set of data using a piecewise linear function.
R8LIB, a FORTRAN77 library which contains many utility routines using double precision real (R8) arithmetic.
RBF_INTERP_1D, a FORTRAN77 library which defines and evaluates radial basis function (RBF) interpolants to 1D data.
SHEPARD_INTERP_1D, a FORTRAN77 library which defines and evaluates Shepard interpolants to 1D data, based on inverse distance weighting.
TEST_INTERP_2D, a FORTRAN77 library which defines test problems for interpolation of data z(x,y), depending on a 2D argument.
TEST_INTERP_ND, a FORTRAN77 library which defines test problems for interpolation of data z(x), depending on an M-dimensional argument.
VANDERMONDE_INTERP_1D, a FORTRAN77 library which finds a polynomial interpolant to data y(x) of a 1D argument, by setting up and solving a linear system for the polynomial coefficients, involving the Vandermonde matrix.