Publication detail
THE NONLOCAL BOUNDARY VALUE PROBLEMS FOR STRONGLY SINGULAR HIGHER-ORDER NONLINEAR FUNCTIONAL-DIFFERENTIAL EQUATIONS
MUKHIGULASHVILI, S.
Original Title
THE NONLOCAL BOUNDARY VALUE PROBLEMS FOR STRONGLY SINGULAR HIGHER-ORDER NONLINEAR FUNCTIONAL-DIFFERENTIAL EQUATIONS
Type
journal article in Web of Science
Language
English
Original Abstract
A priori boundedness principle is proven for the nonlocal boundary value problems for strongly singular higher-order nonlinear functional-differential equations. Several suicient conditions of solvability of the Dirichlet problem under consideration are derived from the a priori boundedness principle. The proof of the a priori boundedness principle is based on the Agarwal{Kiguradze type theorems, which guarantee the existence of the Fredholm property for strongly singular higher-order linear differential equations with argument deviations under the nonlocal boundary conditions.
Keywords
Higher order functional-differential equations, Dirichlet boundary value problem, strong singularity, Fredholm property, a priori boundedness principle.
Authors
MUKHIGULASHVILI, S.
RIV year
2015
Released
31. 12. 2015
Publisher
Udine University
Location
Udine
ISBN
1126-8042
Periodical
Italian Journal of Pure and Applied Mathematics
Year of study
2015
Number
35
State
Republic of Italy
Pages from
23
Pages to
50
Pages count
28
BibTex
@article{BUT122234,
author="Sulkhan {Mukhigulashvili}",
title="THE NONLOCAL BOUNDARY VALUE PROBLEMS FOR STRONGLY SINGULAR HIGHER-ORDER NONLINEAR FUNCTIONAL-DIFFERENTIAL EQUATIONS",
journal="Italian Journal of Pure and Applied Mathematics",
year="2015",
volume="2015",
number="35",
pages="23--50",
issn="1126-8042"
}