Uniform Kazhdan Constants and Paradoxes of the Affine Plane
Abstract
Let G=SL(2,Z)2 and H=SL(2,Z). We prove that the action G2 is uniformly non-amenable and that the quasi-regular representation of G on 2(G/H) has a uniform spectral gap. Both results are a consequence of a uniform quantitative form of ping-pong for affine transformations, which we establish here.
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