On The Rationality Of The Spectrum

Abstract

Let ⊂ R be a compact set with measure 1. If there exists a subset ⊂ R such that the set of exponential functions E:=\eλ(x) = e2π i λ x| :λ ∈ \ is an orthonormal basis for L2(), then is called a spectrum for the set . A set is said to tile R if there exists a set T such that + T = R. A conjecture of Fuglede suggests that Spectra and Tiling sets are related. Lagarias and Wang LW1 proved that Tiling sets are always periodic and are rational. That any spectrum is also a periodic set was proved in BM1, IK. In this paper, we give some partial results to support the rationality of the spectrum.