Numerical Solution for a Class of Evolution Differential Equations with p-Laplacian and Memory
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In this paper we make a study of a partial integral differential equation with p-Laplacian using a mixed finite element method. Two stable and convergent fixed point schemes are proposed to solve the nonlinear algebraic system. Using the implementation of the method in Matlab environment, we numerically analyse the convergence with an example. Some other examples are presented in order to illustrate several asymptotic behaviours and some localization effects of the solutions.
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