English

\alpha-Continuity Properties of Stable Processes

Probability 2007-05-23 v1 Spectral Theory

Abstract

Let DD be a domain of finite Lebesgue measure in \bRd\bR^d and let XtDX^D_t be the symmetric α\alpha-stable process killed upon exiting DD. Each element of the set {λiα}i=1\{\lambda_i^\alpha\}_{i=1}^\infty of eigenvalues associated to XtDX^D_t, regarded as a function of α(0,2)\alpha\in(0,2), is right continuous. In addition, if DD is Lipschitz and bounded, then each λiα \lambda_i^\alpha is continuous in α\alpha and the set of associated eigenfunctions is precompact. We also prove that if DD is a domain of finite Lebesgue measure, then for all 0<α<β20<\alpha<\beta\leq 2 and i1i\geq 1, λiα[λiβ]α/β.\lambda_i^\alpha \leq [ \lambda^\beta_i]^{\alpha/\beta}. Previously, this bound had been known only for β=2\beta=2 and α\alpha rational.

Keywords

Cite

@article{arxiv.math/0407318,
  title  = {\alpha-Continuity Properties of Stable Processes},
  author = {R. D. DeBlassie and Pedro J. Mendez-Hernandez},
  journal= {arXiv preprint arXiv:math/0407318},
  year   = {2007}
}

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22 pages