Necessary and sufficient condition for solvability of a partial integral equation

Authors

  • Yu. Kh. Eshkabilov National University of Uzbekistan, Tashkent, Uzbekistan 

DOI:

Keywords:

Abstract

Let $T_1: L_2(\Omega^2) \to L_2(\Omega^2)$ be a partial integral operator [4,7] with the kernel from $C(\Omega^3)$ where $\Omega=[a,b ]^ u$, $ u \in N$ is fixed. In this paper we investigate solvability of the partial integral equation $f-\varkappa T_1 f=g_0$ in the space $L_2(\Omega^2)$ in the case where $\varkappa$ is a cha ac eristic number. We prove a the theorem that gives a necessary and sufficient condition for solvability of the partial integral equation $f-\varkappa T_1 f=g_0.$

Downloads

Published

2009-03-25

Issue

Vol. 15 No. 1 (2009)

Section

Articles

How to Cite

Eshkabilov, Yu. Kh. “Necessary and Sufficient Condition for Solvability of a Partial Integral Equation”. Methods of Functional Analysis and Topology, vol. 15, no. 1, Mar. 2009, pp. 67-73, https://zen.imath.kiev.ua/index.php/mfat/article/view/410.