Finite Interpolation in Green Function Deterministic Numerical Methods
Copyright policy )Finite Interpolation in Green Function Deterministic Numerical Methods
An expansion on a finite set of interpolating functions is used within the framework of Green function deterministic numerical methods. Applications to some problems with one-dimensional, central and tensor potentials are described. Numerical results are presented and compared with the results of a different technique based on the Hamiltonian and on a discrete variable representation method.
tensor potentials, numerical examples, finite interpolation, Green function deterministic numerical methods, Applications to the sciences, Integral representations of solutions to PDEs, one-dimensional systems
tensor potentials, numerical examples, finite interpolation, Green function deterministic numerical methods, Applications to the sciences, Integral representations of solutions to PDEs, one-dimensional systems
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