Numerical solutions of two-dimensional mixed volterra-fredholm integral equations via bernoulli collocation method
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Date
2017
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Editura Academiei Romane
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Abstract
The mixed Volterra-Fredholm integral equations (VFIEs) arise in various physical and biological models. The main purpose of this article is to propose and analyze efficient Bernoulli collocation techniques for numerically solving classes of two-dimensional linear and nonlinear mixed VFIEs. The novel aspect of the technique is that it reduces the problem under consideration to a system of algebraic equations by using the Gauss-Bernoulli nodes. One of the main advantages of the present approach is its superior accuracy. Consequently, good results can be obtained even by using a relatively small number of collocation nodes. In addition, several numerical results are given to illustrate the features of the proposed technique.
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Volterra-Fredholm Integral Equations, Error Analysis, Collocation Schemes, Bernoulli-Gauss Nodes
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Citation
Hafez, R. M...et al. (20179. "Numerical solutions of two-dimensional mixed volterra-fredholm integral equations via bernoulli collocation method", Romanian Journal Of Physics, Vol. 62, No. 3-4.
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Source
Romanian Journal Of Physics
Volume
62
Issue
3-4