RUS  ENG JOURNALS   PEOPLE   ORGANISATIONS   CONFERENCES   SEMINARS   VIDEO LIBRARY   PACKAGE AMSBIB
 General information Latest issue Archive Impact factor Search papers Search references RSS Latest issue Current issues Archive issues What is RSS

 Vladikavkaz. Mat. Zh.: Year: Volume: Issue: Page: Find

 Vladikavkaz. Mat. Zh., 2020, Volume 22, Number 2, Pages 53–69 (Mi vmj724)

On multidimensional determinant differential-operator equations

I. V. Rakhmelevich

Nizhny Novgorod State University, 23 Gagarin Ave., Nizhny Novgorod 603950, Russia

Abstract: We consider a class of multi-dimensional determinant differential-operator equations, the left side of which represents a determinant with the elements containing a product of linear one-dimensional differential operators of arbitrary order, while the right side of the equation depends on the unknown function and its first derivatives. The homogeneous and inhomogeneous determinant differential-operator equations are investigated separately. Some theorems on decreasing of dimension of equation are proved. The solutions obtained in the form of sum and product of functions in subsets of independent variables, in particular, of functions in one variable. In particular, it is proved that the solution of the equation under considering is the product of eigenfunctions of linear operators contained in the equation. A theorem on interconnection between the solutions of the initial equation and the solutions of some auxiliary linear equation is proved for the homogeneous equation. Also a solution of the homogeneous equation is obtained under the hypotheses that the linear differential operators сontained in the equation have proportional eigenvalues. Traveling wave type solution is obtained, in particular, the solutions of exponential form and also in the form of arbitrary function in linear combination of independent variables. If the linear operators in the equation are homogeneous then the solutions in the form of generalized monomials are also found. Some partial solutions to inhomogeneous equation are obtained provided that the right-hand side contains only either independent variables or power or exponential nonlinearity in unknown function and the powers of its first derivatives.

Key words: determinant differential-operator equation, determinant, linear differential operator, eigenfunction, kernel of an operator, traveling wave type solution.

DOI: https://doi.org/10.46698/g9113-3086-1480-k

Full text: PDF file (267 kB)
References: PDF file   HTML file

UDC: 517.952
MSC: 35G20

Citation: I. V. Rakhmelevich, “On multidimensional determinant differential-operator equations”, Vladikavkaz. Mat. Zh., 22:2 (2020), 53–69

Citation in format AMSBIB
\Bibitem{Rak20} \by I.~V.~Rakhmelevich \paper On multidimensional determinant differential-operator equations \jour Vladikavkaz. Mat. Zh. \yr 2020 \vol 22 \issue 2 \pages 53--69 \mathnet{http://mi.mathnet.ru/vmj724} \crossref{https://doi.org/10.46698/g9113-3086-1480-k}