Gaussian free fields coupled with multiple SLEs driven by stochastic log-gases

Abstract

Miller and Sheffield introduced the notion of an imaginary surface as an equivalence class of pairs of simply connected proper subdomains of C and Gaussian free fields (GFFs) on them under the conformal equivalence. They considered the situation in which the conformal maps are given by a chordal Schramm--Loewner evolution (SLE). In the present paper, we construct GFF-valued processes on H (the upper half-plane) and O (the first orthant of C) by coupling a GFF with a multiple SLE evolving in time on each domain. We prove that a GFF on H and O is locally coupled with a multiple SLE if the multiple SLE is driven by the stochastic log-gas called the Dyson model defined on R and the Bru--Wishart process defined on R+, respectively. We obtain pairs of time-evolutionary domains and GFF-valued processes.