Differential Equations and Control Processes
(Differencialnie Uravnenia i Protsesy Upravlenia)

Integrals of Lappo-Danilevsky Multidimensional Differential System

Author(s):

Viktor Gorbuzov

Department of mathematical analysis,
differential equations and algebra,
Faculty of Mathematics and Information Science,
Yanka Kupala State University of Grodno,
Ozeshko str. 22, Grodno,
Republic of Belarus, 230023

gorbuzov@grsu.by

Andrei Pranevich

Department of mathematic and software support for economic systems,
Faculty of Economics and Management,
Yanka Kupala State University of Grodno,
Ozeshko str. 22, Grodno, Republic of Belarus, 230023

pranevich@grsu.by

Abstract:

In this article we consider a completely solvable real non-autonomous linear system of Lappo-Danilevsky exact differential equations. For this system the spectral method of the integral basis construction has been elaborated. Using common eigenvectors and generalized eigenvectors of the integral matrices of a completely solvable Lappo-Danilevsky system we get real first integrals of this system in explicit form. The explicit forms of first integral, which depend on the multiplicity of integral matrices primer divisors, are given, and the sufficient conditions of the existence of autonomous first integrals for this differential system has been obtained. In addition, some examples are given to illustrate the results. Keywords: system of total differential equations, first integral.

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