General theory of regular biorthogonal pairs and its physical applications

Abstract

In this paper we introduce a general theory of regular biorthogonal sequences and its physical applications. Biorthogonal sequences \ φn \ and \ n \ in a Hilbert space H are said to be regular if Span\; \ φn \ and Span\; \ n \ are dense in H. The first purpose is to show that there exists a non-singular positive self-adjoint operator Tf in H defined by an ONB f \ fn \ in H such that φn=Tf fn and n= Tf-1 fn, n=0,1, ·s, and such an ONB f is unique. The second purpose is to define and study the lowering operators Af and Bf, the raising operators Bf and Af, the number operators Nf and Nf determined by the non-singular positive self-adjoint operator Tf. These operators connect with quasi- hermitian \; quantum \; mechanics and its relatives. This paper clarifies and simplifies the mathematical structure of this framework minimized the required assumptions.