Spectral property of self-affine measures on Rn

Abstract

We study spectral properties of the self-affine measure μM, D generated by an expanding integer matrix M∈ Mn(Z) and a consecutive collinear digit set D=\0,1,…,q-1\v where v∈ Zn\0\ and q 2 is an integer. Some sufficient conditions for μM, D to be a spectral measure or to have infinitely many orthogonal exponentials are given. Moreover, for some special cases, we can obtain a necessary and sufficient condition on the spectrality of μM, D. Our study generalizes the one dimensional results proved by Dai, et al. (Dai-He-Lai2013, Dai-He-Lau2014).