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Compact and Monotone Difference Schemes for the Generalized Fisher Equation

П. П. МатусInstitute of MathematicsB. D. UtebaevInstitute of Mathematics, National Academy of Sciences of Belarus, Minsk, 220072, Belarus
2022en
ABI

Abstract

For the generalized Fisher equation with nonlinear convection, monotone and compact difference schemes of $$4+1$$ and $$4+2 $$ approximation orders are constructed and studied on standard stencils with nonstandard relations for the time and space steps. A priori estimates for the difference solution are obtained in the nonlinear case based on the established two-sided estimates for the grid solution. These results are generalized to a two-dimensional generalized Fisher equation with nonlinear convection. The computational experiment conducted illustrates the efficiency of the methods considered.

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