Regular biorthogonal pairs and Psuedo-bosonic operators

Abstract

The first purpose of this paper is to show a method of constructing a regular biorthogonal pair based on the commutation rule: ab-ba=I for a pair of operators a and b acting on a Hilbert space H with inner product ( · | · ). Here, sequences \ φn \ and \ n \ in a Hilbert space H are biorthogonal if ( φn | m)= δnm, n,m=0,1, ·s, and they are regular if both Dφ Span \ φn \ and D Span \ n \ are dense in H. Indeed, the assumption to construct the regular biorthogonal pair coincide with the definition of pseudo-bosons as originally given in Ref bagarello10. Furthermore, we study the connections between the pseudo-bosonic operators a, \; b, \; a, \; b and the pseudo-bosonic operators defined by a regular biorthogonal pair (\ φn \, \ n \ ) and an ONB e of H in appeared Ref hiroshi1. The second purpose is to define and study the notion of D-pseudo bosons in Ref bagarello13, bagarello2013 and give a method of constructing D-pseudo bosons on some steps. Then it is shown that for any ONB e= \ en \ in H and any operators T and T-1 in L ( D), we may construct operators A and B satisfying D-pseudo bosons, where D is a dense subspace in a Hilbert space H and L ( D) the set of all linear operators T from D to D such that T D ⊂ D, where T is the adjoint of T. Finally, we give some physical examples of D-pseudo bosons based on standard bosons by the method of constructing D-pseudo bosons stated above.