Spectrality of generalized Sierpinski-type self-affine measures

TL;DR

This paper completely characterizes when certain Sierpinski-type self-affine measures are spectral, focusing on cases previously unexamined where both the determinant of the matrix and the area determinant are multiples of 3.

Contribution

It provides necessary and sufficient conditions for the spectrality of Sierpinski-type self-affine measures in the remaining unresolved case.

Findings

Complete characterization of spectral measures in the remaining case

Necessary and sufficient conditions established

Settles the spectrality problem for these measures

Abstract

For an expanding integer matrix $M\in M_2(\mathbb{Z})$ and an integer digit set $D=\{(0,0)^t,(\alpha_1,\alpha_2)^t,(\beta_1,\beta_2)^t\}$ with $\alpha_1\beta_2-\alpha_2\beta_1\neq0$, let $\mu_{M,D}$ be the Sierpinski-type self-affine measure defined by $\mu_{M,D}(\cdot)=\frac{1}{3}\sum_{d\in D}\mu_{M,D}(M(\cdot)-d)$. In [5.36], the authors separately investigated the spectral property of the measure $\mu_{M,D}$ in the case of $\det(M)\notin 3\mathbb{Z}$ or $\alpha_1\beta_2-\alpha_2\beta_1\notin 3\mathbb{Z}$. In this paper, we consider the remaining case where $\det(M)\in 3\mathbb{Z}$ and $\alpha_1\beta_2-\alpha_2\beta_1\in 3\mathbb{Z}$, and give the necessary and sufficient conditions for $\mu_{M,D}$ to be a spectral measure. This completely settles the spectrality of the Sierpinski-type self-affine measure $\mu_{M,D}$.