Hole probabilities for finite and infinite Ginibre ensembles

Abstract

We study the hole probabilities of the infinite Ginibre ensemble X∞, a determinantal point process on the complex plane with the kernel K(z,w)= 1πez w-12|z|2-12|w|2 with respect to the Lebesgue measure on the complex plane. Let U be an open subset of open unit disk D and X∞(rU) denote the number of points of X∞ that fall in rU. Then, under some conditions on U, we show that r ∞1r4 P[ X∞(rU)=0]=R-RU, where is the empty set and RU:=∈fμ∈ P(Uc)\ 1|z-w|dμ(z)dμ(w)+∫ |z|2dμ(z) \, P(Uc) is the space of all compactly supported probability measures with support in Uc. Using potential theory, we give an explicit formula for RU, the minimum possible energy of a probability measure compactly supported on Uc under logarithmic potential with a quadratic external field. Moreover, we calculate RU explicitly for some special sets like annulus, cardioid, ellipse, equilateral triangle and half disk.