Nonlinear Fermions and Coherent States

Abstract

Nonlinear fermions of degree n (n-fermions) are introduced as particles with creation and annihilation operators obeying the simple nonlinear anticommutation relation AA + A^n An = 1. The (n+1)-order nilpotency of these operators follows from the existence of unique A-vacuum. Supposing appropreate (n+1)-order nilpotent para-Grassmann variables and integration rules the sets of n-fermion number states, 'right' and 'left' ladder operator coherent states (CS) and displacement-operator-like CS are constructed. The (n+1)×(n+1) matrix realization of the related para-Grassmann algebra is provided. General (n+1)-order nilpotent ladder operators of finite dimensional systems are expressed as polynomials in terms of n-fermion operators. Overcomplete sets of (normalized) 'right' and 'left' eigenstates of such general ladder operators are constructed and their properties briefly discussed.