On the support of a non-autocorrelated function on a hyperbolic surface

Abstract

Let f be a non-negative square-integrable function on a finite volume hyperbolic surface , and assume that f is non-autocorrelated, that is, perpendicular to its image under the operator of averaging over the circle of a fixed radius r. We show that in this case the support of f is small, namely, it satisfies μ(suppf) ≤ (r+1)e-r2 μ(). As a corollary, we prove a lower bound for the measurable chromatic number of the graph, whose vertices are the points of , and two points are connected by an edge if there is a geodesic of length r between them. We show that for any finite covolume the measurable chromatic number is at least er2(r+1)-1.