An Improved Leray-Trudinger Inequality

Arka Mallick; Cyril Tintarev

arXiv:1601.03194·math.AP·March 22, 2016

An Improved Leray-Trudinger Inequality

Arka Mallick, Cyril Tintarev

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Abstract

In this article, we have derived the following Leray-Trudinger type inequality on a bounded domain $Ω$ in $R^{n}$ containing the origin. \begin{align*} \displaystyle{\sup_{u\in W^{1,n}_{0}(\Omega), I_{n}[u,\Omega,R]\leq 1}}\int_{\Omega} e^{c_n\left(\frac{|u(x)|}{E_{2}^{\beta}(\frac{|x|}{R})}\right)^{\frac{n}{n-1}}} dx < +\infty \ \text{, for some } c_n>0 \ \text{depending only on } n. \end{align*} Here $β = \frac{2}{n}$ , $I_{n} [u, Ω, R] := \int_{Ω} ∣\nabla u ∣^{n} d x - (\frac{n - 1}{n})^{n} \int_{Ω} \frac{∣ u ∣ ^{n}}{∣ x ∣ ^{n} E _{1}^{n} ( \frac{∣ x ∣}{R} )} d x$ , $R \geq x \in Ω sup ∣ x ∣$ and $E_{1} (t) := lo g (\frac{e}{t})$ , $E_{2} (t) := lo g (e E_{1} (t))$ for $t \in (0, 1] .$ This improves an earlier result by Psaradakis and Spector. Also we have proved that, for any $c > 0$ the above inequality is false, if we take $β < \frac{1}{n} .$

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