Large Genus Asymptotics for Siegel-Veech Constants

Abstract

In this paper we consider the large genus asymptotics for two classes of Siegel-Veech constants associated with an arbitrary connected stratum H (α) of Abelian differentials. The first is the saddle connection Siegel-Veech constant cscmi, mj ( H (α) ) counting saddle connections between two distinct, fixed zeros of prescribed orders mi and mj, and the second is the area Siegel-Veech constant carea ( H(α) ) counting maximal cylinders weighted by area. By combining a combinatorial analysis of explicit formulas of Eskin-Masur-Zorich that express these constants in terms of Masur-Veech strata volumes, with a recent result for the large genus asymptotics of these volumes, we show that cscmi, mj ( H (α) ) = (mi + 1) (mj + 1) ( 1 + o(1) ) and carea ( H(α) ) = 12 + o(1), both as |α| = 2g - 2 tends to ∞. The former result confirms a prediction of Zorich and the latter confirms one of Eskin-Zorich in the case of connected strata.