Twisted CP(N-1) instanton projectors and the N-level quantum density matrix

Abstract

Twisted classical solutions to the CPN-1 model play a key role in the analysis of such models on the spatially compactified cylinder SL1 × R1 and have recently been shown to be important for the resurgent structure of this quantum field theory. Instantons and non-self-dual solutions both fractionalize, and domain walls formed by such topological solutions can be associated with N-vacua having maximally repulsive energy eigenvalues. The purpose of this paper is to reinforce this view through the investigation of a number of parallels between the CPN-1 model and N-level quantum mechanical density matrices. Specifically, we demonstrate the existence of a time-evolution equation for the CPN-1 instanton projector analogous to the Liouville-von Neumann equation in the quantum mechanical formalism. The group theoretical analysis of density matrices and the CPN-1 model are also closely related. Finally, we explore the emergence of geometrical (Berry) phases in both systems and their interrelationship.