Fundamental solution of a multidimensional difference equation with periodical and matrix coefficients

tion theorems of the Leray Schauder type (see [6,9]). The aim of the present paper is to show that the same methodology can be adapted to prove the existence of periodic solutions for more general classes of equations and systems.

A nonlinear difference equation with periodic coefficients and constant delays is considered in this note and an oscillation criterion is obtained. This criterion is obtained by means of a generalized characteristic equation. Published by Elsevier Science Ltd.

A closed form solution of a second order linear homogeneous difference equation with variable coefficients is presented. As an application of this solution, Ž . we obtain expressions for cos n and sin n q 1 rsin as polynomials in cos .

For a class of nonlinear homogeneous difference equations with periodic coefficients, it is shown that every nonoscillatory entire solution has exponential bounds and that the oscillation is equivalent to nonexistence of a part of positive characteristic roots. Sufficient conditions for oscillation

s hypergeometric functions of three variables a b s t r a c t We consider an equation Here α, β, γ are constants, moreover 0 < 2α, 2β, 2γ < 1. The main result of this paper is a construction of eight fundamental solutions for the above-given equation in an explicit form. They are expressed by Laur