On the ergodicity of infinite antisymmetric extensions of symmetric IETs
Abstract
In this article, we consider skew product extensions over symmetric interval exchange transformations with respect to the cocycle f(x)=(0,1/2)-(1/2,1). More precisely, we prove that for almost every interval exchange transformation T with symmetric combinatorial data, the skew product Tf: [0, 1) × Z [0, 1) × Z given by Tf(x,r)=(T(x),r+f(x)) is ergodic with respect to the product of the Lebesgue and counting measure.
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