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On Ɛ-uniform convergence of exponentially fitted methods (CROSBI ID 214209)

Prilog u časopisu | izvorni znanstveni rad | međunarodna recenzija

Marušić, Miljenko On Ɛ-uniform convergence of exponentially fitted methods // Mathematical communications, 19 (2014), 3; 545-559

Podaci o odgovornosti

Marušić, Miljenko

engleski

On Ɛ-uniform convergence of exponentially fitted methods

A class of methods constructed to numerically approximate the solution of two-point singularly perturbed boundary value problems of the form εu′′ + bu′ + cu = f use exponentials to mimic exponential behavior of the solution in the boundary layer(s). We refer to them as exponentially fitted methods. Such methods are usually exact on polynomials of certain degree and some exponential functions. Shortly, they are exact on exponential sums. It is often possible that consistency of the method follows from the convergence of the interpolating function standing behind the method. Because of that, we consider the interpolation error for exponential sums. The main result of the paper is an error bound for interpolation by the exponential sum to the solution of the singularly perturbed problem that does not depend on perturbation parameter ε when ε is small with the respect to mesh width. The numerical experiment implies that the use of a dense mesh in the boundary layer for small meshwidth results in ε-uniform convergence.

: difference scheme ; tension spline ; singular perturbation ; ODE ; interpolation ; exponential sum

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Podaci o izdanju

19 (3)

2014.

545-559

objavljeno

1331-0623

1848-8013

Povezanost rada

Matematika

Indeksiranost