Statistical mechanics of quantum error correcting codes

TL;DR

This paper develops a statistical mechanical framework for understanding one-dimensional stabilizer quantum error correcting codes under hybrid dynamics, linking entanglement properties to domain wall free energies and code distances.

Contribution

It introduces a novel entanglement domain wall model and connects the code distance to a crossover length scale where energy and entropy balance.

Findings

Capillary-wave theory captures qualitative features of QECC.

Contiguous code distance diverges with system size, enhancing error protection.

Numerical evidence supports the entanglement domain wall framework.

Abstract

We study stabilizer quantum error correcting codes (QECC) generated under hybrid dynamics of local Clifford unitaries and local Pauli measurements in one dimension. Building upon 1) a general formula relating the error-susceptibility of a subregion to its entanglement properties, and 2) a previously established mapping between entanglement entropies and domain wall free energies of an underlying spin model, we propose a statistical mechanical description of the QECC in terms of "entanglement domain walls". Free energies of such domain walls generically feature a leading volume law term coming from its "surface energy", and a sub-volume law correction coming from thermodynamic entropies of its transverse fluctuations. These are most easily accounted for by capillary-wave theory of liquid-gas interfaces, which we use as an illustrative tool. We show that the information-theoretic decoupling criterion corresponds to a geometric decoupling of domain walls, which further leads to the identification of the "contiguous code distance" of the QECC as the crossover length scale at which the energy and entropy of the domain wall are comparable. The contiguous code distance thus diverges with the system size as the subleading entropic term of the free energy, protecting a finite code rate against local undetectable errors. We support these correspondences with numerical evidence, where we find capillary-wave theory describes many qualitative features of the QECC; we also discuss when and why it fails to do so.