Quantum recurrence of a subspace and operator-valued Schur functions

TL;DR

This paper generalizes the concept of monitored recurrence in quantum processes to subspaces, linking it with operator-valued Schur functions and spectral measures, revealing new topological and probabilistic properties.

Contribution

It introduces a spectral characterization of subspace recurrence using operator-valued Schur functions, extending previous state-focused results to arbitrary subspaces.

Findings

Recurrent subspaces have purely singular spectral measures.

Expected return times are rational and linked to topological phases.

State recurrence can outperform subspace recurrence in return probabilities.

Abstract

A notion of monitored recurrence for discrete-time quantum processes was recently introduced in [Commun. Math. Phys., DOI 10.1007/s00220-012-1645-2] (see also arXiv:1202.3903) taking the initial state as an absorbing one. We extend this notion of monitored recurrence to absorbing subspaces of arbitrary finite dimension. The generating function approach leads to a connection with the well-known theory of operator-valued Schur functions. This is the cornerstone of a spectral characterization of subspace recurrence that generalizes some of the main results in the above mentioned paper. The spectral decomposition of the unitary step operator driving the evolution yields a spectral measure, which we project onto the subspace to obtain a new spectral measure that is purely singular iff the subspace is recurrent, and consists of a pure point spectrum with a finite number of masses precisely when all states in the subspace have a finite expected return time. This notion of subspace recurrence also links the concept of expected return time to an Aharonov-Anandan phase that, in contrast to the case of state recurrence, can be non-integer. Even more surprising is the fact that averaging such geometrical phases over the absorbing subspace yields an integer with a topological meaning, so that the averaged expected return time is always a rational number. Moreover, state recurrence can occasionally give higher return probabilities than subspace recurrence, a fact that reveals once more the counterintuitive behavior of quantum systems. All these phenomena are illustrated with explicit examples, including as a natural application the analysis of site recurrence for coined walks.