Local average of the hyperbolic circle problem for Fuchsian groups

Abstract

Let ⊂eq PSL(2, R) be a finite volume Fuchsian group. The hyperbolic circle problem is the estimation of the number of elements of the -orbit of z in a hyperbolic circle around w of radius R, where z and w are given points of the upper half plane and R is a large number. An estimate with error term e2 3R is known, and this has not been improved for any group. Recently Risager and Petridis proved that in the special case =PSL(2, Z) taking z=w and averaging over z in a certain way the error term can be improved to e(7 12+ε)R. Here we show such an improvement for a general , our error term is e(5 8+ε)R (which is better that e2 3R but weaker than the estimate of Risager and Petridis in the case =PSL(2, Z)). Our main tool is our generalization of the Selberg trace formula proved earlier.