Modified Riemann–Liouville integro-differential operators in the class of harmonic functions and their applications

Authors

  • B.T. Torebek
    Institute of Mathematics and Mathematical Modeling, Ministry of Education and Science, Almaty, Republic of Kazakhstan
    Al-Farabi Kazakh National University, Almaty, Republic of Kazakhstan

DOI:

https://doi.org/10.13108/2015-7-3-73

Keywords:

Laplace equation, harmonic function, Bavrin operator, Riemann–Liouville operators, nonlocal problems.

Abstract

In this work we study the properties of some modified integro-differential Riemann–Liouville integro-differential operators. As application of the properties of these operators we consider some local and nonlocal boundary value problems for Laplace equation in a ball. We prove existence and uniqueness for the studied problems. These problems generalize known Dirichlet and Bitsadze–Samarski problems.

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Published

20.09.2015

Issue

Vol. 7 No. 3 (2015): Ufa Mathematical Journal 2015, volume 7 , issue 3

Section

Article