Quantum circuit dynamics via path integrals: Is there a classical action for discrete-time paths?

TL;DR

This paper explores whether classical action concepts can be applied to discrete-time paths in certain quantum circuits, specifically Clifford circuits with continuous-variable or odd-prime dimension discrete systems, using phase-space representations.

Contribution

It introduces a method to define classical actions for discrete-time paths in Clifford circuits via phase-space symplectomorphisms and algebraic geometry tools, linking quantum phases to classical generating functions.

Findings

Defines classical action for discrete paths using generating functions

Shows the approach correctly reproduces quantum relative phases

Applies to Clifford circuits with continuous-variable or odd-prime dimension systems

Abstract

It is straightforward to give a sum-over-paths expression for the transition amplitudes of a quantum circuit as long as the gates in the circuit are balanced, where to be balanced is to have all nonzero transition amplitudes of equal magnitude. Here we consider the question of whether, for such circuits, the relative phases of different discrete-time paths through the configuration space can be defined in terms of a classical action, as they are for continuous-time paths. We show how to do so for certain kinds of quantum circuits, namely, Clifford circuits where the elementary systems are continuous-variable systems or discrete systems of odd-prime dimension. These types of circuit are distinguished by having phase-space representations that serve to define their classical counterparts. For discrete systems, the phase-space coordinates are also discrete variables. We show that for each gate in the generating set, one can associate a symplectomorphism on the phase-space and to each of these one can associate a generating function, defined on two copies of the configuration space. For discrete systems, the latter association is achieved using tools from algebraic geometry. Finally, we show that if the action functional for a discrete-time path through a sequence of gates is defined using the sum of the corresponding generating functions, then it yields the correct relative phases for the path-sum expression. These results are likely to be relevant for quantizing physical theories where time is fundamentally discrete, characterizing the classical limit of discrete-time quantum dynamics, and proving complexity results for quantum circuits.