Large deviations of crowding in finite β-ensembles

Abstract

We consider finite β-ensembles Xn,β F with n points on F, where F denotes either the real line or the complex plane. Let U be a bounded subset of F such that ∂ U (the boundary of U) is polar for F= R and ∂ U is a closed 1--rectifiable set with finite 1-dimensional Hausdorff measure. Suppose Xn,β F(U) denotes the number of points in the region U. We show that the sequence of laws of \n-1 Xn,β F(U); n 1\ satisfies the large deviation type bound with speed n2 and with a good rate function. For F = R, this result can be derived using the contraction principle. However, when F = C, the contraction principle does not yield the desired outcome. Therefore, we adopt a direct approach to establish our results.