부산대학교 도서관

The 1st level General Fractional Derivatives (GFDs) combine in one definition the GFDs of the Riemann-Liouville type and the regularized GFDs (or the GFDs of the Caputo type) that have been recently introduced and actively studied in the Fractional Calculus literature. In this paper, we first construct an operational calculus of Mikusi\'nski type for the 1st level GFDs. In particular, it includes the operational calculi for the GFDs of the Riemann-Liouville type and for the regularized GFDs as its particular cases. In the second part of the paper, this calculus is applied for derivation of the closed form solution formulas to the initial-value problems for the linear fractional differential equations with the 1st level GFDs.
Comment: 33 pages