Reversed inequality of the Herbst-type and the related Euler-Lagrange system

Abstract

In 2008, Beckner (Proc. Amer. Math. Soc. 136(5), 1871-1885) proved two inequalities of the Herbst type, which are the critical forms of the Stein-Weiss inequality. In 2018, Chen et al. (Tran. Amer. Math. Soc. 370(12), 8429-8450) established the reversed Stein-Weiss inequality. In this paper, we are concerned about its critical case and give a reversed Herbst inequality. Namely, |∫Rn∫Rn|x-y|α/q'-n|y|α/q'g(x)h(y)dxdy| ≥ Cn,α,p,q'\|g\|Lq'(Rn)\|h\|Lp(Rn) holds for any nonnegative functions g ∈ Lq'(Rn) and h ∈ Lp(Rn), where n≥ 1, p, q' ∈ (0,1), α>n satisfying 1/p+1/q'-2α/(q'n)=1. Such an inequality is not covered by the reversed Stein-Weiss inequality. Meanwhile, we prove the existence of extremal functions of this inequality. Finally, we study the Euler-Lagrange system satisfied by those extremal functions \matrix u(x)=∫Rn|x-y|β-nv-p2(y)|y|βdy, v(x)=∫Rn|x-y|β-nu-p1(y)|x|βdy. matrix. We obtain necessary conditions for the existence of positive solutions, and investigate their integrability and asymptotic behavior when |x| 0 and |x| ∞.

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