Some Hardy-type inequalities with sharp constants via the divergence theorem
DOI:
https://doi.org/10.70474/kyayda88Keywords:
Hardy inequality, Sharp constant, non-increasing rearrangement, Divergence theoremAbstract
Hardy’s inequality originated in the early twentieth century when G.H. Hardy introduced this fundamental result in real analysis to bound integral operators. Its elegant formulation and optimal constants spurred widespread interest, leading to numerous refinements. These developments laid the groundwork for further exploration and multidimensional extensions, deeply influencing harmonic analysis, partial differential equations, and mathematical physics. This historical evolution continues to inspire modern advancements in research.
We discuss multidimensional generalizations of some improved Hardy inequalities based on the divergence theorem. The obtained Hardy-type inequalities extend a recent version of the one-dimensional Hardy inequality with the best constant to multidimensional cases.
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References
FrankR. L. LaptevA. WeidlT. An improved one-dimensional Hardy inequality, J. Math. Sci. (N.Y.), 268, 2022, 3, Problems in mathematical analysis. No. 118, 323--3427.
FrankR. L. LaptevA. WeidlT. Schrödinger Operators: Eigenvalues and Lieb-Thirring Inequalities, Cambridge University Press, 2022.
RoychowdhuryP. RuzhanskyM. SuraganD. Multidimensional Frank-Laptev-Weidl improvement of the Hardy inequality, Proceedings of the Edinburgh Mathematical Society, 67, 1, 2024, 151--167.
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