Non-spectral problem for the planar self-affine measures

Abstract

In this paper, we consider the non-spectral problem for the planar self-affine measures μM,D generated by an expanding integer matrix M∈ M2(Z) and a finite digit set D⊂Z2. Let p≥2 be a positive integer, Ep2:=1p\(i,j)t:0≤ i,j≤ p-1\ and ZD2:=\x∈[0, 1)2:Σd∈ De2π i d,x=0\. We show that if ≠ZD2⊂ Ep2\0\ and ((M),p)=1, then there exist at most p2 mutually orthogonal exponential functions in L2(μM,D). In particular, if p is a prime, then the number p2 is the best.