Numerical Quenching solutions of Localized Semilinear Parabolic Equation with a Variable Reaction


Abstract


In this paper, we study the semidiscrete approximation for the following initial-boundary value problem

and l=1/2. We prove, under suitable conditions on p(x) and initial datum, that the semidiscrete solution quenches in a finite time and estimate its semidiscrete quenching time. We also establish the convergence of the semidiscrete quenching time to the theoretical one when the mesh size tendsto zero. Finally, we give some numerical experiments for a best illustration ofour analysis.


Keywords


semidiscretizations, localized semilinear parabolicequation, semidiscrete quenching time, convergence.

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References


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