Geodesic
On the convergence of a high order approximation difference scheme for the modified equation of fractional order moisture transfer
Vestnik Tverskogo gosudarstvennogo universiteta. Seriâ Prikladnaâ matematika, no. 3 (2024), pp. 42-54
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The first boundary value problem for the modified moisture transfer equation with two Gerasimov-Caputo fractional differentiation operators of different orders $\alpha, \beta$ is studied. A difference scheme of a higher order of accuracy is constructed on a uniform grid. A priori estimates for different values of $\alpha, \beta$ are obtained by the method of energy inequalities for solving the difference problem. The obtained estimates imply the uniqueness and stability of the solution with respect to the right-hand side and initial data, as well as the convergence of the solution of the difference problem to the solution of the original differential problem at a rate equal to the order of approximation.
Keywords: first boundary value problem, a priori estimate, modified moisture transfer equation, fractional order differential equation, Gerasimov-Caputo fractional derivative. 
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M. KH. Beshtokov. On the convergence of a high order approximation difference scheme for the modified equation of fractional order moisture transfer. Vestnik Tverskogo gosudarstvennogo universiteta. Seriâ Prikladnaâ matematika, no. 3 (2024), pp. 42-54. http://geodesic.mathdoc.fr/item/VTPMK_2024_3_a3/

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