Scaling limit of the discrete Gaussian free field with degenerate random conductances
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We consider discrete Gaussian free fields with ergodic random conductances on a class of random subgraphs of $\mathbb{Z}^{d}$, $d \geq 2$, including i.i.d.\ supercritical percolation clusters, where the conductances are possibly unbounded but satisfy a moment condition. As our main result, we show that, for almost every realization of the environment, the rescaled field converges in law towards a continuum Gaussian free field. We also present a scaling limit for the covariances of the field. To obtain the latter, we establish a quenched local limit theorem for the Green's function of the associated random walk among random conductances with Dirichlet boundary conditions.
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Scaling limits for nonlinear functionals of the discrete Gaussian free field with degenerate random conductances
Nonlinear functionals of the discrete GFF with degenerate random conductances on ergodic random subgraphs converge almost surely to continuum counterparts in H^{-s}(D).
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