Learning transitions in classical Ising models and deformed toric codes

Conditional probability distributions describe the effect of learning an initially unknown classical state through Bayesian inference. Here we demonstrate the existence of a sharp learning transition for the two-dimensional classical Ising model, all the way from the infinite-temperature paramagnetic state down to the thermal critical state. The intersection of the line of learning transitions and the thermal Ising transition is a novel tricritical point. Our model also describes the effects of weak measurements on a family of quantum states which interpolate between the (topologically ordered) toric code and a trivial product state. Notably, the location of the above tricritical point implies that the quantum memory in the entire topological phase is robust to weak measurement, even when the initial state is arbitrarily close to the quantum phase transition separating topological and trivial phases. Our analysis uses a replica field theory combined with the renormalization group, and we chart out the phase diagram using a combination of tensor network and Monte Carlo techniques. Our results can be extended to study the more general effects of learning on both classical and quantum states.