On the spectral theory of groups of automorphisms of S-adic nilmanifolds
Abstract
Let S=\p1, …, pr,∞\ for prime integers p1, …, pr. Let X be an S-adic compact nilmanifold, equipped with the unique translation invariant probability measure μ. We characterize the countable groups of automorphisms of X for which the Koopman representation on L2(X,μ) has a spectral gap. More specifically, we show that does not have a spectral gap if and only if there exists a non-trivial -invariant quotient solenoid (that is, a finite-dimensional, connected, compact abelian group) on which acts as a virtually abelian group.
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