On the integrability of a class of differential equations

Zlatanovska, Biljana and Piperevski, Boro (2021) On the integrability of a class of differential equations. Bulletin Mathématique, 45 (2). pp. 85-93. ISSN 0351-336X (print), 1857-9914 (online)

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Official URL: https://doi.org/10.37560/matbil21452085z

Abstract

In this paper, a class of second-order linear differential equations is reviewed. For this class of B.S.Popov necessary and sufficient condition for reductable according to Frobenius is obtained. By using another method, the same condition is obtained where the existence of the natural number n is replaced by the existence of an integer n. For the same class of second-order linear differential equations, the case for reductable according to Frobenius which is independent from an exist of a number n is reviewed. In both cases, formulas of one particular solution and transformation to a system of rstorder dierential equations are obtained. In end, this theory is supported by examples

Item Type:	Article
Subjects:	Natural sciences > Matematics
Divisions:	Faculty of Computer Science
Depositing User:	Biljana Zlatanovska
Date Deposited:	28 Nov 2022 09:52
Last Modified:	28 Nov 2022 09:52
URI:	https://eprints.ugd.edu.mk/id/eprint/30554

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