Volume of spheres in doubling metric measured spaces and in groups of polynomial growth
Abstract
Let G be a compactly generated locally compact group and let U be a compact generating set. We prove that if G has polynomial growth, then (Un) is a Folner sequence: that is, the volume of the boundary of Un divided by Un goes to zero. Moreover, we give a polynomial estimate of this ratio. Our proof is based on doubling property. As a matter of fact, the result remains true in a wide class of doubling metric measured spaces including manifolds and graphs. As an application, we obtain a balls averages Lp-pointwise ergodic theorem for probability G-spaces, with G of polynomial growth and for all p greater than 1.
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