The cardinality of orthogonal exponentials of planar self-affine measures with three-element digit sets
Abstract
In this paper, we consider the planar self-affine measures μM,D generated by an expanding matrix M∈ M2(Z) and an integer digit set D=\ ( array*20c 0\\ 0 array ),( array*20c α1\\ α2 array ),( array*20c β1\\ β2 array ) \ with α1β2-α2β1≠0. We show that if (M) 3Z, then the mutually orthogonal exponential functions in L2(μM,D) is finite, and the exact maximal cardinality is given.
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