On Herz-Bochkarev limiting problem
Abstract
This paper studies Hausdorff-Young-type inequalities within the framework of Lorentz spaces Lp,q. Focusing on the dependence of the associated constants on the integrability parameter p, we derive optimal bounds in the limiting case p→ 2, addressing the Herz-Bochkarev problem. The results obtained refine the pioneering estimates in [3] and are comparable to recent advances in [16]. The main ingredients of our approach are new grand Lorentz space techniques.
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