M. Yu. Kokurin, S. I. Piskarev, M. Spreafico, “Finite-Difference Methods for Fractional Differential Equations of Order <nobr>$1/2$</nobr>”, Itogi Nauki i Tekhniki. Sovrem. Mat. Pril. Temat. Obz., 2017, Volume 133,Pages <nobr>120

This article is cited in 2 papers

Finite-Difference Methods for Fractional Differential Equations of Order $1/2$

M. Yu. Kokurin^a, S. I. Piskarev^b, M. Spreafico^c

^a Mari State University, Ioshkar-Ola
^b Lomonosov Moscow State University, Research Computing Center
^c Department of Mathematics and Physics, Instituto Nazionale di Fisica Nucleare, Lecce, Italy

Abstract: In this work, we study approximations of solutions of fractional differential equations of order ${1}/{2}$. We present a new method of approximation and obtain the order of convergence. The presentation is given within the abstract framework of a semidiscrete approximation scheme, which includes finite-element methods, finite-difference schemes, and projection methods.

Keywords: fractional Cauchy problem, Banach space, $\alpha$-times resolution family, discretization methods, difference scheme, error estimate.

UDC: 519.63

MSC: 45L05; 65M12