Spectrality of Self-Similar Tiles

Abstract

We call a set K ⊂ Rs with positive Lebesgue measure a spectral set if L2(K) admits an exponential orthonormal basis. It was conjectured that K is a spectral set if and only if K is a tile (Fuglede's conjecture). Despite the conjecture was proved to be false on Rs, s≥ 3 ([T], [KM2]), it still poses challenging questions with additional assumptions. In this paper, our additional assumption is self-similarity. We study the spectral properties for the class of self-similar tiles K in R that has a product structure on the associated digit sets. We show that any strict product-form tiles and the associated modulo product-form tiles are spectral sets. As for the converse question, we give a pilot study for the self-similar set K generated by arbitrary digit sets with four elements. We investigate the zeros of its Fourier transform due to the orthogonality, and verify Fuglede's conjecture for this special case.