ON A TWO-POINT BOUNDARY VALUE PROBLEM FOR A SYSTEM OF DIFFERENTIAL EQUATIONS WITH MANY TRANSFORMED ARGUMENTS

M Filipchuk

doi:10.31861/bmj2021.01.24

Abstract

A.M. Samoilenko’s numerical-analytic method is a well-known and eﬀective research method of solvability and approximate construction of the solutions of various boundary value problems for systems of diﬀerential equations. The investigation of boundary value problems for new classes of systems of functional- diﬀerential equations by this method is still an actual problem. A boundary value problem for a system of diﬀerential equations with ﬁnite quantity of transformed arguments in the case of linear two-point boundary conditions is considered at this paper. In order to study the questions of the existence and approximate construction of a solution of this problem, we used a modiﬁcation of A.M. Samoilenko’s numerical-analytic method without determining equation, i.e. the method has an analytical component only. Suﬃcient conditions for the existence of a unique solution of the considered boundary value problem and an error estimation of the constructed successive approximations are obtained. The use of the developed modiﬁcation of the method is illustrated by concrete examples.

Highlights

Ðîçãëÿäà1òüñÿ êðàéîâà çàäà÷à äëÿ ñèñòåìè äèôåðåíöiàëüíèõ ðiâíÿíü iç ñêií÷åííîþ êiëüêiñòþ ïåðåòâîðåíèõ àðãóìåíòiâ ó âèïàäêó ëiíiéíèõ äâîòî÷êîâèõ êðàéîâèõ óìîâ.
Äëÿ äîñëiäæåííÿ ïèòàííÿ iñíóâàííÿ òà íàáëèæåíîïîáóäîâè ðîçâ'ÿçêó öi1 ̈ çàäà÷i âèêîðèñòàíî ìîäèôiêàöiþ ÷èñåëüíî-àíàëiòè÷íîãî ìåòîäó À.Ì.
Ñàìîéëåíêà, ó ÿêié âiäñóòí1 âèçíà÷àëüíå ðiâíÿííÿ, òîáòî ìåòîä ìà1 ëèøå àíàëiòè÷íó ñêëàäîâó.

Summary

Introduction

Ðîçãëÿäà1òüñÿ êðàéîâà çàäà÷à äëÿ ñèñòåìè äèôåðåíöiàëüíèõ ðiâíÿíü iç ñêií÷åííîþ êiëüêiñòþ ïåðåòâîðåíèõ àðãóìåíòiâ ó âèïàäêó ëiíiéíèõ äâîòî÷êîâèõ êðàéîâèõ óìîâ. Äëÿ äîñëiäæåííÿ ïèòàííÿ iñíóâàííÿ òà íàáëèæåíîïîáóäîâè ðîçâ'ÿçêó öi1 ̈ çàäà÷i âèêîðèñòàíî ìîäèôiêàöiþ ÷èñåëüíî-àíàëiòè÷íîãî ìåòîäó À.Ì. Ñàìîéëåíêà, ó ÿêié âiäñóòí1 âèçíà÷àëüíå ðiâíÿííÿ, òîáòî ìåòîä ìà1 ëèøå àíàëiòè÷íó ñêëàäîâó. Îòðèìàíî äîñòàòíi óìîâè iñíóâàííÿ 1äèíîãî ðîçâ'ÿçêó ðîçãëÿäóâàíîêðàéîâîçàäà÷i òà îöiíêó ïîõèáêè ïîáóäîâàíèõ ïîñëiäîâíèõ íàáëèæåíü.

Results

Conclusion