Lp -Lq boundedness of Fourier multipliers on quantum Euclidean spaces

Abstract

In this paper, we study Fourier multipliers on quantum Euclidean spaces and obtain results on their Lp -Lq boundedness. On the way to get these results, we prove Paley, Hausdorff-Young-Paley, and Hardy-Littlewood inequalities on the quantum Euclidean space. As applications, we establish the Lp -Lq estimate for the heat semigroup and Sobolev embedding theorem on quantum Euclidean spaces. We also obtain quantum analogues of the logarithmic Sobolev and Nash type inequalities.

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