Multidimensional local limit theorem in deterministic systems and an application to non-convergence of polynomial multiple averages

Abstract

We show that for every ergodic and aperiodic probability preserving system (X,B,m,T), there exists f:X Zd, whose corresponding cocycle satisfies the d-dimensional local central limit theorem. We use the 2-dimensional result to resolve a question of Huang, Shao and Ye and Franzikinakis and Host regarding non-convergence in L2 of polynomial multiple averages of non-commuting zero entropy transformations. Our methods also give the first examples of failure of multiple recurrence for zero entropy transformations along polynomial iterates.