Sharp Hardy's Inequalities in Hilbert Spaces
Abstract
We study the behavior of the smallest possible constants d(a,b) and dn in Hardy's inequalities ∫ab(1x∫axf(t)dt)2\,dx≤ d(a,b)\,∫ab [f(x)]2 dx and Σk=1n(1kΣj=1kaj)2≤ dn\,Σk=1nak2. The exact constant d(a,b) and the precise rate of convergence of dn are established and the extremal function and the ``almost extremal'' sequence are found.
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