Hausdorff dimension of recurrence sets for matrix transformations of tori

Abstract

Let Td Td, defined by T x=Ax( 1), where A is a d× d integer matrix with eigenvalues 1<|λ1||λ2|…|λd|. We investigate the Hausdorff dimension of the recurrence set \[R():=\x∈Td Tnx∈ B(x,(n)) ~for~infinitely~ many~n\\] for α|λd/λ1|, where is a positive decreasing function defined on N and its lower order at infinity is α=n∞- (n)n. In the case that A is diagonalizable over Q with integral eigenvalues, we obtain the dimension formula.