English

Stahl-Totik Regularity for Dirac Operators

Spectral Theory 2020-12-24 v1 Mathematical Physics Classical Analysis and ODEs math.MP

Abstract

We develop a theory of regularity for Dirac operators with uniformly locally square-integrable operator data. This is motivated by Stahl--Totik regularity for orthogonal polynomials and by recent developments for continuum Schr\"odinger operators, but contains significant new phenomena. We prove that the symmetric Martin function at \infty for the complement of the essential spectrum has the two-term asymptotic expansion (zb2z)+o(1z)\Im \left( z - \frac{b}{2 z}\right) + o(\frac 1z) as ziz \to i \infty, which is seen as a thickness statement for the essential spectrum. The constant bb plays the role of a renormalized Robin constant and enters a universal inequality involving the lower average L2L^2-norm of the operator data. However, we show that regularity of Dirac operators is not precisely characterized by a single scalar equality involving bb and is instead characterized by a family of equalities. This work also contains a sharp Combes--Thomas estimate (root asymptotics of eigensolutions), a study of zero counting measures, and applications to ergodic and decaying operator data.

Keywords

Cite

@article{arxiv.2012.12889,
  title  = {Stahl-Totik Regularity for Dirac Operators},
  author = {Benjamin Eichinger and Ethan Gwaltney and Milivoje Lukić},
  journal= {arXiv preprint arXiv:2012.12889},
  year   = {2020}
}

Comments

34 pages

R2 v1 2026-06-23T21:19:17.574Z