Fractal and Fractional (Jul 2021)

On Solvability of the Sonin–Abel Equation in the Weighted Lebesgue Space

  • Maksim V. Kukushkin

DOI
https://doi.org/10.3390/fractalfract5030077
Journal volume & issue
Vol. 5, no. 3
p. 77

Abstract

Read online

In this paper we present a method of studying a convolution operator under the Sonin conditions imposed on the kernel. The particular case of the Sonin kernel is a kernel of the fractional integral Riemman–Liouville operator, other various types of the Sonin kernels are a Bessel-type function, functions with power-logarithmic singularities at the origin e.t.c. We pay special attention to study kernels close to power type functions. The main our aim is to study the Sonin–Abel equation in the weighted Lebesgue space, the used method allows us to formulate a criterion of existence and uniqueness of the solution and classify a solution, due to the asymptotics of the Jacobi series coefficients of the right-hand side.

Keywords