Dimensions of a class of self-affine Moran sets and measures in 2

Abstract

For each integer k>0, let nk and mk be integers such that nk≥ 2, mk≥ 2, and let Dk be a subset of \0,…,nk-1\× \0,…,mk-1\. For each w=(i,j)∈ Dk, we define an affine transformation on~2 by w(x)=Tk(x+w), w∈Dk, where Tk=diag(nk-1,mk-1). The non-empty compact set E=k=1∞(w1w2… wk)∈ Πi=1kDi w1 w2 … wk is called a self-affine Moran set. In the paper, we provide the lower, packing, box-counting and Assouad dimensions of the self-affine Moran set E. We also explore the dimension properties of self-affine Moran measure μ supported on E, and we provide Hausdorff, packing and entropy dimension formulas of μ.