Spectrality of product-form self-similar measures and tiles
Abstract
This paper studies the Fourier properties of self-similar measures and tiles generated by digit sets of product-form. Let 0 < <1 be a real number and let D be the direct sum of two consecutive integer sets: D=\0,1,·s,N-1\ m\0,1,·s, L-1\, where N, m, L ∈ N* with %N, L ≥ 2 N, L ≥ 2. The pair (,D) determines the self-similar iterated function system (IFS) \φd(·)=(·+d)\d ∈ D. Let μ,D and T be the associated self-similar measure and self-similar set, respectively. We first prove that L2(μ,D) admits an exponential orthonormal basis if and only if -1=p∈N satisfies N p, L p and N m(m,pd), where d=\i:(mL(mL,pi),L)≠ 1,i∈N\. This result extends a series of previous studies, including the cases where N,L are primes [An-Wang, J. Funct. Anal., 2021] and N=L [Liu-Peng-Wu, J. Math. Anal. Appl., 2019]. Furthermore, in the context of the Fuglede conjecture, we show that when -1 =\#D= NL, the space L2(T dx) admits an exponential orthonormal basis if and only if T is a translation tile of R.
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