Ellen Powell, Hao Wu
Published 2015-09-08Version 1
We study the level lines of a Gaussian free field in a planar domain with general boundary data $F$. We show that the level lines exist as continuous curves under the assumption that $F$ is regulated (i.e., admits left and right limits at every point), and satisfies certain inequalities. Moreover, these level lines are a.s. determined by the field. This allows us to define and study a generalization of the SLE$_4(\underline{\rho})$ process, now with a continuum of force points. A crucial ingredient is a monotonicity property in terms of the boundary data which strengthens a result of Miller and Sheffield and is also of independent interest.
KPZ relation does not hold for the level lines and the SLE$_κ$ flow lines of the Gaussian free field
The Gaussian free field and Hadamard's variational formula
A note on Ising random currents, Ising-FK, loop-soups and the Gaussian free field
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