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On higher order Poincare inequalities with radial derivatives and Hardy improvements on the hyperbolic space

On higher order Poincare inequalities with radial derivatives and Hardy improvements on the hyperbolic space

ROYCHOWDHURY, PRASUN
URI: http://dr.iiserpune.ac.in:8080/xmlui/handle/123456789/5848
https://doi.org/10.1007/s10231-021-01083-9
Date: 2021-03


Abstract:

In this paper we prove higher order PoincarÌ© inequalities involving radial derivatives namely, ‰öÇHN|‰öàkr,HNu|2dvHN‰ä´(N‰öÕ12)2(k‰öÕl)‰öÇHN|‰öàlr,HNu|2dvHN for all u‰ööHk(HN), where underlying space is N-dimensional hyperbolic space HN, 0‰ä?l<k are integers and the constant (N‰öÕ12)2(k‰öÕl) is sharp. Furthermore we improve the above inequalities by adding Hardy-type remainder terms and the sharpness of some constants is also discussed.

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