The explicit formula for solution of wave differential equation with fractional derivatives in the multi-dimensional space
Askar RahmonovBukhara State UniversityD. K. DurdievBukhara Branch of the Institute of Mathematics at the Academy of Sciences of the Republic of UzbekistanElina ShishkinaBukhara State University
2024en
ABI
Аннотация
This paper devoted to the obtaining the explicit solution of $n$-dimensional wave equation with Gerasimov–Caputo fractional derivative in the infinite domain with non-zero initial condition and vanishing condition at infinity. It is shown that this equation can be derived from the classical homogeneous hyperbolic integro-differential equation with memory in which the kernel is $t^{1-\alpha}E_{2-\alpha, 2-\alpha}(-t^{2-\alpha}), \ \alpha\in(1, 2),$ where $E_{\alpha, \beta}$ is the Mittag-Liffler function. Based on Laplace and Fourier transforms the properties of the Fox H-function and convolution theorem, explicit solution for the solution of the considered problem is obtained.
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Показатели — AkademScholar · Скоро