Juhan Aru
Published 2013-12-04, updated 2014-02-06Version 2
In this paper we mingle the Gaussian free field, the Schramm-Loewner evolution and the KPZ relation in a natural way, shedding new light on all of them. Our principal result shows that the level lines and the SLE$_\kappa$ flow lines of the Gaussian free field do not satisfy the usual KPZ relation. In order to prove this, we have to make a technical detour: by a careful study of a certain diffusion process, we provide exact estimates of the exponential moments of winding of chordal SLE curves conditioned to pass nearby a fixed point. This extends previous results on winding of SLE curves by Schramm.
Comments: 47 pages; 4 beautiful images and 2 other figures; in ver2: extended SLE winding theorem 5.1 to also cover the case \kappa = 4; minor revisions all over the paper
Level lines of the Gaussian Free Field with general boundary data
Coupling of Gaussian free field with general slit SLE
Phase transition and level-set percolation for the Gaussian free field
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