Connectedness of planar self-affine sets associated with non-consecutive collinear digit sets

Abstract

In the paper, we focus on the connectedness of planar self-affine sets T(A,D) generated by an integer expanding matrix A with | (A)|=3 and a collinear digit set D=\0,1,b\v, where b>1 and v∈ R2 such that \v, Av\ is linearly independent. We discuss the domain of the digit b to determine the connectedness of T(A,D). Especially, a complete characterization is obtained when we restrict b to be an integer. Some results on the general case of | (A)|> 3 are obtained as well.