Difference schemes of high accuracy for a Sobolev-type pseudoparabolic equation
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Karaganda National Research University named after àcademician Ye.A. Buketov
Abstract
In this work, numerical algorithms of higher-order accuracy are constructed and studied for a pseudoparabolic
equation that describes the filtration process in fractured-porous media. The increase in the
order of accuracy is achieved in various ways. First, only the spatial variables are approximated, as in the
method of lines. Then, to solve the resulting system of linear ordinary differential equations, the finite
difference method and the finite element method are applied. The application of these methods makes it
possible to achieve a higher order of approximation for the difference schemes. Schemes of fourth-order
accuracy in the spatial variables and second-order in time are presented, as well as schemes of fourth-order
accuracy in all variables. Based on the stability theory of three-level difference schemes, stability conditions
for the proposed algorithms are obtained. Using a special technique for solving the difference schemes, a
priori estimates are derived, and based on them, theorems on convergence and accuracy are proven in
the class of smooth solutions to the differential problem. An implementation algorithm is proposed for
the difference scheme constructed using the finite element method. Test examples for one-dimensional
and two-dimensional equations are also provided, demonstrating the higher-order accuracy of the proposed
schemes.
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Aripov M.M. Difference schemes of high accuracy for a Sobolev-type pseudoparabolic equation / M.M. Aripov, D. Utebaev, R.T. Djumamuratov // Bulletin of the Karaganda University. Mathematics Series. – 2025. – № 4(120). – pp 21-32.