Quadratic pencil of difference equations: Jost solutions, spectrum, and principal vectors

Abstract

In this paper, a quadratic pencil of Schr\"odinger type difference operator Lλ is taken under investigation to give a general perspective on the spectral analysis of non-selfadjoint difference equations of second order. Introducing Jost-type solutions, structural and quantitative properties of spectrum of the operator Lλ are analyzed and hence, a discrete analog of the theory in Degasperis, (J.Math.Phys. 11: 551--567, 1970) and Bairamov et. al, (Quaest. Math. 26: 15--30, 2003) is developed. In addition, several analogies are established between difference and q-difference cases. Finally, the principal vectors of Lλ are introduced to lay a groundwork for the spectral expansion. Mathematics Subject Classification (2000): 39A10, 39A12, 39A13