Fourier coefficients of × p-invariant measures

Abstract

We consider densities D(A), D(A) and D(A) for a subset A of N with respect to a sequence of finite subsets of N and study Fourier coefficients of ergodic, weakly mixing and strongly mixing × p-invariant measures on the unit circle T. Combining these, we prove the following measure rigidity results: on T, the Lebesgue measure is the only non-atomic × p-invariant measure satisfying one of the following: (1) μ is ergodic and there exist a F lner sequence in N and a nonzero integer l such that μ is × (pj+l)-invariant for all j in a subset A of N with D(A)=1; (2) μ is weakly mixing and there exist a F lner sequence in N and a nonzero integer l such that μ is × (pj+l)-invariant for all j in a subset A of N with D(A)>0; (3) μ is strongly mixing and there exists a nonzero integer l such that μ is × (pj+l)-invariant for infinitely many j. Moreover, a × p-invariant measure satisfying (2) or (3) is either a Dirac measure or the Lebesgue measure. As an application we prove that for every increasing function τ defined on positive integers with n∞τ(n)=∞, there exists a multiplicative semigroup Sτ of Z+ containing p such that |Sτ[1,n]|≤ (p n)τ(n) and the Lebesgue measure is the only non-atomic ergodic × p-invariant measure which is × q-invariant for all q in Sτ.