On some spectral properties of the weighted $\overline\partial$-Neumann problem
arXiv:1509.08741 · doi:10.1215/21562261-2019-0013
Abstract
We derive a necessary condition for compactness of the weighted $\overline\partial$-Neumann operator on the space $L^2(\mathbb C^n,e^{-Ï})$, under the assumption that the corresponding weighted Bergman space of entire functions has infinite dimension. Moreover, we compute the essential spectrum of the complex Laplacian for decoupled weights, $Ï(z) = Ï_1(z_1) + \dotsb + Ï_n(z_n)$, and investigate (non-) compactness of the $\overline\partial$-Neumann operator in this case. More can be said if every $ÎÏ_j$ defines a nontrivial doubling measure.
11 pages; fixed some mistakes and added new results