Introducing nonlinear gauge transformations in a family of nonlinear Schrödinger equations.

In earlier work we proposed a family of nonlinear time-evolution equations for quantum mechanics associated with certain unitary group representations. Such nonlinear Schrr odinger equations are expected to describe irreversible and dissipative quantum systems. Here we introduce and justify physically the group of nonlinear gauge transformations necessary to interpret our equations. We determine the parameters that are actually gauge-invariant, and describe some of their properties. Our conclusions contradict, at least in part, the view that any nonlinearity in quantum mechanics leads to unphysical predictions. We also show how time-dependent nonlinear gauge transformations connect our equations to those proposed by Kostin and by Bialynicki-Birula and Mycielski. We believe our approach to be a fundamental generalization of the usual notions about gauge transformations in quantum mechanics.