Connectedness of planar self-affine sets associated with non-collinear digit sets
Abstract
We study the connectedness of the planar self-affine sets T(A,D) generated by an integer expanding matrix A with |(A)|=3 and a non-collinear digit set D=\0, v, kAv\ where k∈ Z\0\ and v∈ Z2 such that \v, Av\ is linearly independent. By checking the characteristic polynomials of A case by case, we obtain a criterion concerning only k to determine the connectedness of T(A,D).
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