Bounds of Dirichlet eigenvalues for Hardy-Leray operator

Abstract

The purpose of this paper is to study the eigenvalues \λμ,i \i for the Dirichlet Hardy-Leray operator, i.e. - u+μ|x|-2u=λ u\ \ in\ \, , u=0\ \ on\ \ ∂, where - +μ|x|2 is the Hardy-Leray operator with μ≥ -(N-2)24 and is a smooth bounded domain with 0∈. We provide lower bounds of \λμ,i \i together with the Li-Yau's one for μ>-(N-2)24 and Karachalio's one for μ∈ [-(N-2)24,0). Secondly, we obtain Cheng-Yang's type upper bounds for λμ,k. Finally, we get the Weyl's limit of eigenvalues which is independent of the potential's parameter μ. This interesting phenomena indicates that the inverse-square potential does not play an essential role for the asymptotic behavior of the spectral of the problem considered.