Bernoulli Wavelet Based Numerical Method for Solving Fredholm Integral Equations of the Second Kind
Authors
S. C. Shiralashetti and R. A. Mundewadi
Abstract
In this paper, a Bernoulli wavelet based numerical method for the solution of Fredholm integral
equations of the second kind is proposed. The method is based upon Bernoulli wavelet approximations. The
Bernoulli wavelet (BW) is first presented and the resulting Bernoulli wavelet matrices are utilized to reduce
the Fredholm integral equations into algebraic equations. Solving these equations using MATLAB to obtain
Bernoulli coefficients. The numerical results of the proposed method through the illustrative examples is
presented in comparison with the exact and existing methods (Haar wavelet method (HWM) [13], Hermite
cubic splines (HCS) [11]) of solution from the literature are shown in tables and figures, which show that the
validity and applicability of the technique with higher accuracy even for the smaller values of N.
