Non-Salem sets in multiplicative Diophantine approximation
Abstract
In this paper, we answer a question of Cai-Hambrook in (arXiv 2403.19410). Furthermore, we compute the Fourier dimension of the multiplicative -well approximable set M2×()=\(x1,x2)∈ [0,1]2 \|qx1\|\|qx2\|<(q) for infinitely many q∈ \, where [0,14) is a positive function satisfying Σq(q)1(q)<∞. As a corollary, we show that the set M2×(q q-τ) is non-Salem for τ>1.
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