Some weighted Hardy-type inequalities and applications

Abstract

We study the two-weighted estimate \[ \|Σk=0nak(x)∫0xtkf(t)dt|Lq,v(0,∞)\|≤ c\|f|Lp,u(0,∞)\|,* \] where the functions ak(x) are not assumed to be positive. It is shown that for 1<p≤ q≤∞, provided that the weight u satisfies the certain conditions, the estimate (*) holds if and only if the estimate \[ Σk=0n\|ak(x)∫0xtkf(t)dt|Lq,v(0,∞)\| ≤ c\|f|Lp,u(0,∞)\|.** \] is fulfilled. The necessary and sufficient conditions for (**) to be valid are well-known. The obtained result can be applied to the estimates of differential operators with variable coefficients in some weighted Sobolev spaces.

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