Random length-spectrum rigidity for free groups
Abstract
We say that a subset S⊂eq FN is spectrally rigid if whenever T1, T2∈ cvN are points of the (unprojectivized) Outer space such that ||g||T1=||g||T2 for every g∈ S then T1=T2 in . It is well-known that FN itself is spectrally rigid; it also follows from the result of Smillie and Vogtmann that there does not exist a finite spectrally rigid subset of FN. We prove that if A is a free basis of FN (where N 2) then almost every trajectory of a non-backtracking simple random walk on FN with respect to A is a spectrally rigid subset of FN.
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