Composite Quantum Coriolis Forces

Abstract

In a consistent quantum theory known as "non-Hermitian interaction picture" (NIP), the standard quantum Coriolis operator S(t) emerges whenever the observables of a unitary system are given in their quasi-Hermitian and non-stationary rather than "usual" representations. With S(t) needed, in NIP, in both the Schrodinger-like and Heisenberg-like dynamical evolution equations we show that another, amended and potentially simplified theory can be based on an auxiliary N-term factorization of the Dyson's Hermitization map O(t). The knowledge of this factorization is shown to lead to a multiplet of alternative eligible Coriolis forces S-n(t) with n=0,1, horizontal ellipsis ,N. The related formulae for the measurable predictions constitute a new formalism refered to as "factorization-based non-Hermitian interaction picture" (FNIP). The conventional NIP formalism (where N=1) becomes complemented by an (N-1)-plet of its innovative "hybrid" alternatives. Some of the respective ad hoc adaptations of observables may result in an optimal representation of quantum dynamics.