Abstract
In the present paper, we have studied the technique by which a differentiation matrix corresponding to scaling and wavelet function is helpful in representing an integral equation in discrete form. In this technique, only finite times continuously differentiable scaling and wavelet functions were used for the differentiation matrix. This method explores the applications of compactly supported wavelets in discretization of Fredholm integral equation and provides us with a bridge for the solution of integral equations via compactly supported finitely differentiable wavelets.
Recommended Citation
Kumar, Viresh and Kumar, Rakesh
(2025).
(SI15-084) Application of Differentiation Matrices Corresponding to Scaling and Wavelet Functions to Integral Equations,
Applications and Applied Mathematics: An International Journal (AAM), Vol. 20,
Iss.
4, Article 6.
Available at:
https://digitalcommons.pvamu.edu/aam/vol20/iss4/6