The Markov property for 43 on the cylinder

Abstract

We prove that the 43 model satisfies a version of Segal's axioms in the special case of three-dimensional tori and cylinders. As a consequence, we give the first proof that this model satisfies a Markov property and we characterize its boundary law up to absolutely continuous perturbations. In addition, we use Segal's axioms to give an alternative construction of the 43 Hamiltonian on two-dimensional tori as compared with Glimm (Comm. Math. Phys., 1968). We exploit this probabilistic approach to prove novel fundamental spectral properties of the Hamiltonian, such as discrete spectrum and a Perron-Froebenius type result on its ground state. The key technical contributions of this article are the development of tools to analyze 43 models with rough boundary conditions. We heavily use the variational approach to 43 models introduced in Barashkov and Gubinelli (Duke, 2020) that is based on the Bou\'e-Dupuis formula and dual to Polchinski's continuous renormalization group.