English

Krein-like extensions and the lower boundedness problem for elliptic operators

Analysis of PDEs 2014-11-04 v3 Spectral Theory

Abstract

For selfadjoint extensions tilde-A of a symmetric densely defined positive operator A_min, the lower boundedness problem is the question of whether tilde-A is lower bounded {\it if and only if} an associated operator T in abstract boundary spaces is lower bounded. It holds when the Friedrichs extension A_gamma has compact inverse (Grubb 1974, also Gorbachuk-Mikhailets 1976); this applies to elliptic operators A on bounded domains. For exterior domains, A_gamma ^{-1} is not compact, and whereas the lower bounds satisfy m(T)\ge m(tilde-A), the implication of lower boundedness from T to tilde-A has only been known when m(T)>-m(A_gamma). We now show it for general T. The operator A_a corresponding to T=aI, generalizing the Krein-von Neumann extension A_0, appears here; its possible lower boundedness for all real a is decisive. We study this Krein-like extension, showing for bounded domains that the discrete eigenvalues satisfy N_+(t;A_a)=c_At^{n/2m}+O(t^{(n-1+varepsilon)/2m}) for t\to\infty .

Keywords

Cite

@article{arxiv.1002.4549,
  title  = {Krein-like extensions and the lower boundedness problem for elliptic operators},
  author = {Gerd Grubb},
  journal= {arXiv preprint arXiv:1002.4549},
  year   = {2014}
}

Comments

35 pages, revised for misprints and accepted for publication in Journal of Differential Equations

R2 v1 2026-06-21T14:50:41.462Z