(Fn) and the spectral gap conjecture

Abstract

For n>2, given φ1,...,φn randomly chosen isometries of S2, it is well-known that the group generated by φ1,...,φn acts ergodically on S2. It is conjectured in GJS that for almost every choice of φ1,...,φn this action is strongly ergodic. This is equivalent to the spectrum of φ1+φ1∈v+...+φn+φn∈v as an operator on L2(S2) having a spectral gap, i.e. all eigenvalues but the largest one being bounded above by some λ1<2n. (The largest eigenvalue λ0, corresponding to constant functions, is 2n.) In this article we show that if n>2, then either the conjecture is true or almost every n-tuple fails to have a gap. In fact, the same result is holds for any n-tuple φ1,..., φn in any any compact group K that is an almost direct product of SU(2) factors with L2(S2) replaced by L2(X) where X is any homogeneous K space. A weaker result is proven for n=2 and some conditional results for similar actions of Fn on homogeneous spaces for more general compact groups.

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