A higher moment formula for the Siegel--Veech transform over quotients by Hecke triangle groups
Abstract
We compute higher moments of the Siegel--Veech transform over quotients of SL(2,R) by the Hecke triangle groups. After fixing a normalization of the Haar measure on SL(2,R) we use geometric results and linear algebra to create explicit integration formulas which give information about densities of k-tuples of vectors in discrete subsets of R2 which arise as orbits of Hecke triangle groups. This generalizes work of W.~Schmidt on the variance of the Siegel transform over SL(2,R)/SL(2,Z).
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