PT-Symmetric Representations of Fermionic Algebras

Abstract

A recent paper by Jones-Smith and Mathur extends PT-symmetric quantum mechanics from bosonic systems (systems for which T2=1) to fermionic systems (systems for which T2=-1). The current paper shows how the formalism developed by Jones-Smith and Mathur can be used to construct PT-symmetric matrix representations for operator algebras of the form η2=0, η2=0, ηη+ η =α 1, where eta=ηPT =PT η T-1P-1. It is easy to construct matrix representations for the Grassmann algebra (α=0). However, one can only construct matrix representations for the fermionic operator algebra (α≠0) if α= -1; a matrix representation does not exist for the conventional value α=1.