The cardinality of orthogonal exponentials of planar self-affine measures with three-element digit sets

In this paper, we consider the planar self-affine measures mu(M,D) generated by an expanding matrix M is an element of M-2(Z) and an integer digit set D = {((0)(0)), ((alpha 1)(alpha 2)), ((beta 1)(beta 2))} with alpha(1)beta(2) - alpha(2)beta(1) not equal 0. We show that if det(M) is not an element of 3Z, then the mutually orthogonal exponential functions in L-2(mu(M,D)) is finite, and the exact maximal cardinality is given. (C) 2018 Elsevier Inc. All rights reserved.