Spectrality of a class of moran measures on R2
Abstract
We investigate spectral properties of planar Moran measures μ\Mn\,\Dn\ generated by sequences of expanding matrices \Mn\⊂ GL(2,Z) and digit sets \Dn\⊂Z2, where each digit set has the form Dn = \ pmatrix 0 \\ 0 pmatrix, pmatrix αn1 \\ αn2 pmatrix, pmatrix βn1 \\ βn2 pmatrix, pmatrix -αn1-βn1 \\ -αn2-βn2 pmatrix \ satisfying αn1βn2-αn2βn1 0 2. Under the hypotheses |(Mn)| > 4 for all n≥ 1, n≥ 1\|Mn-1\| < 1, and \Dn\ is finite, we establish the following characterization: μ\Mn\,\Dn\ is a spectral measure Mn ∈ GL(2,2Z) for all n≥ 2. Furthermore, for the critical case |(Mn)| = 4, we derive a complete spectral criterion for a significant class of Moran measures through combinatorial analysis of digit sets. These results extend current understanding of spectral self-affine measures to Moran-type constructions.
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