An Improved Leray-Trudinger Inequality

Abstract

In this article, we have derived the following Leray-Trudinger type inequality on a bounded domain in Rn containing the origin. align* u∈ W1,n0(), In[u,,R]≤ 1∫ ecn(|u(x)|E2β(|x|R))nn-1 dx < +∞ \ , for some cn>0 \ depending only on n. align* Here β = 2n, In[u,,R] := ∫|∇ u |ndx- (n-1n)n∫|u|n|x|nE1n(|x|R)dx , R ≥ x∈ |x| and E1(t) := (et), E2(t) := (eE1(t)) for t∈ (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 < 1n.