Point Processes and Multiple SLE/GFF Coupling

Abstract

In the series of lectures, we will discuss probability laws of random points, curves, and surfaces. Starting from a brief review of the notion of martingales, one-dimensional Brownian motion (BM), and the D-dimensional Bessel processes, BESD, D ≥ 1, first we study Dyson's Brownian motion model with parameter β >0, DYSβ, which is regarded as multivariate extensions of BESD with the relation β=D-1. Next, using the reproducing kernels of Hilbert function spaces, the Gaussian analytic functions (GAFs) are defined on a unit disk and an annulus. As zeros of the GAFs, determinantal point processes and permanental-determinantal point processes are obtained. Then, the Schramm--Loewner evolution with parameter >0, SLE, is introduced, which is driven by a BM on R and generates a family of conformally invariant probability laws of random curves on the upper half complex plane H. We regard SLE as a complexification of BESD with the relation =4/(D-1). The last topic of lectures is the construction of the multiple SLE, which is driven by the N-particle process on R and generates N interacting random curves in H. We prove that the multiple SLE/GFF coupling is established, if and only if the driving N-particle process on R is identified with DYSβ with the relation β=8/.

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