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CUBIC SPLINE ADAPTIVE WAVELET SCHEME TO SOLVE SINGULARLY PERTURBED REACTION DIFFUSION PROBLEMS - MaRDI portal

CUBIC SPLINE ADAPTIVE WAVELET SCHEME TO SOLVE SINGULARLY PERTURBED REACTION DIFFUSION PROBLEMS

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Publication:5386735

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DOI10.1142/S021969130700177XzbMath1153.65379MaRDI QIDQ5386735

Vivek Kumar, Mani Mehra

Publication date: 14 May 2008

Published in: International Journal of Wavelets, Multiresolution and Information Processing (Search for Journal in Brave)

Mathematics Subject Classification ID

Spectral, collocation and related methods for boundary value problems involving PDEs (65N35) Reaction-diffusion equations (35K57) Numerical methods for wavelets (65T60) Spectral, collocation and related methods for initial value and initial-boundary value problems involving PDEs (65M70)

Related Items (14)

Fast and Slow Boundary Oscillations in a Thin Domain ⋮ Wavelet optimized finite difference method using interpolating wavelets for self-adjoint singularly perturbed problems ⋮ An efficient wavelet-based collocation method for handling singularly perturbed boundary-value problems in fluid mechanics ⋮ A hybrid method using wavelets for the numerical solution of boundary value problems on the interval ⋮ An operational Haar wavelet collocation method for solving singularly perturbed boundary-value problems ⋮ A splitting algorithm for the wavelet transform of cubic splines on a nonuniform grid ⋮ Postprocessing Galerkin method using quadratic spline wavelets and its efficiency ⋮ Review of wavelet methods for the solution of reaction-diffusion problems in science and engineering ⋮ Sparse wavelet representation of differential operators with piecewise polynomial coefficients ⋮ Numerical solution of singularly perturbed problems using Haar wavelet collocation method ⋮ QUANTITATIVE IDENTIFICATION OF ROTOR CRACKS BASED ON FINITE ELEMENT OF B-SPLINE WAVELET ON THE INTERVAL ⋮ A NEW REFINEMENT WAVELET–GALERKIN METHOD IN A SPLINE LOCAL MULTIRESOLUTION ANALYSIS SCHEME FOR BOUNDARY VALUE PROBLEMS ⋮ Wavelet B-Splines Bases on the Interval for Solving Boundary Value Problems ⋮ Treatment of Singularly Perturbed Differential Equations with Delay and Shift Using Haar Wavelet Collocation Method

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