Near-critical dimers and massive SLE

We consider the dimer model on the square and hexagonal lattices with doubly periodic weights. Although in the near-critical regime the Kasteleyn matrix is related to a massive Laplacian, Chhita proved that on the whole plane square lattice, the corresponding height function has a scaling limit which surprisingly is not even Gaussian. The purpose of this paper is threefold: (a) we establish a rigourous connection with the massive SLE$_2$ constructed by Makarov and Smirnov (and recently revisited by Chelkak and Wan); (b) we show that the convergence takes place in arbitrary ({bounded}) domains subject to Temperleyan boundary conditions, and that the scaling limit is universal; and (c) we prove conformal covariance of the scaling limit. This requires allowing the drift to be a smoothly varying vector field; along the way we prove that the corresponding loop-erased random walk has a universal scaling limit. Our techniques rely on the imaginary geometry approach developed in \cite{BLR_DimersGeometry} and some exact discrete Girsanov identities which are of independent interest.