arXiv:1810.03859 Abstract | arXiv Analytics

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Hardy's Inequality for Laguerre Expansions of Hermite Type

Published 2018-10-09Version 1

Hardy's inequality for Laguerre expansions of Hermite type with the index $\al\in(\{-1/2\}\cup[1/2,\infty))^d$ is proved in the multi-dimensional setting with the exponent $3d/4$. We also obtain the sharp analogue of Hardy's inequality with $L^1$ norm replacing $H^1$ norm at the expense of increasing the exponent by an arbitrarily small value.

Comments: 15 pages

DOI: 10.1007/s00041-018-9642-2

Categories: math.CA

Subjects: 42C10, 42B30, 33C45

Keywords: hardys inequality, laguerre expansions, hermite type, arbitrarily small value, sharp analogue

Tags: journal article

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arXiv:1810.03859 [math.CA]Abstract References Reviews Resources

Hardy's Inequality for Laguerre Expansions of Hermite Type

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Hardy's Inequality for Laguerre Expansions of Hermite Type

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