Optimizers of the Finite-Rank Hardy-Lieb-Thirring Inequality for Hardy-Schr\"odinger Operator

Abstract

We study the following finite-rank Hardy-Lieb-Thirring inequality of Hardy-Schr\"odinger operator: equation* Σi=1N|λi(--c|x|2-V)|s≤ Cs,d(N)∫ RdV+s+ d2dx, equation* where N∈ N+, d≥3, 0<c≤ c*:=(d-2)24, c*>0 is the best constant of Hardy's inequality, and V∈ Ls+ d2( Rd) holds for s>0. Here λi(--c|x|-2-V) denotes the i-th min-max level of Hardy-Schr\"odinger operator Hc,V:=--c|x|-2-V in Rd, which equals to the i-th negative eigenvalue (counted with multiplicity) of Hc,V in Rd if it exists, and vanishes otherwise. We analyze the existence and analytical properties of the optimizers for the above inequality.