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PT-Symmetric Representations of Fermionic Algebras

Published 21 Apr 2011 in hep-th, math-ph, math.MP, and quant-ph | (1104.4156v1)

Abstract: A 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 $\eta2=0$, $\bar{\eta}2=0$, $\eta\bar{\eta}+\bar {\eta} =\alpha 1$, where $\bar{eta}=\eta{PT} =PT \eta T{-1}P{-1}$. It is easy to construct matrix representations for the Grassmann algebra ($\alpha=0$). However, one can only construct matrix representations for the fermionic operator algebra ($\alpha\neq0$) if $\alpha= -1$; a matrix representation does not exist for the conventional value $\alpha=1$.

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