Topological error correcting processes from fixed-point path integrals

Abstract

We propose a unifying paradigm for analyzing and constructing topological quantum error correcting codes as dynamical circuits of geometrically local channels and measurements. To this end, we relate such circuits to discrete fixed-point path integrals in Euclidean spacetime, which describe the underlying topological order: If we fix a history of measurement outcomes, we obtain a fixedpoint path integral carrying a pattern of topological defects. As an example, we show that the stabilizer toric code, subsystem toric code, and CSS honeycomb Floquet code can be viewed as one and the same code on different spacetime lattices, and the honeycomb Floquet code is equivalent to the CSS honeycomb Floquet code under a change of basis. We also use our formalism to derive two new error-correcting codes, namely a Floquet version of the 3 + 1-dimensional toric code using only 2-body measurements, as well as a dynamic code based on the double-semion stringnet path integral.