A contour line of the continuum Gaussian free field

Abstract

Consider an instance h of the Gaussian free field on a simply connected planar domain with boundary conditions -λ on one boundary arc and λ on the complementary arc, where λ is the special constant π/8. We argue that even though h is defined only as a random distribution, and not as a function, it has a well-defined zero contour line connecting the endpoints of these arcs, whose law is SLE(4). We construct this contour line in two ways: as the limit of the chordal zero contour lines of the projections of h onto certain spaces of piecewise linear functions, and as the only path-valued function on the space of distributions with a natural Markov property.