POINTWISE EIGENFUNCTION ESTIMATES AND INTRINSIC ULTRACONTRACTIVITY-TYPE PROPERTIES OF FEYNMAN-KAC SEMIGROUPS FOR A CLASS OF LEVY PROCESSES
成果类型:
Article
署名作者:
Kaleta, Kamil; Lorinczi, Jozsef
署名单位:
Wroclaw University of Science & Technology; Loughborough University
刊物名称:
ANNALS OF PROBABILITY
ISSN/ISSBN:
0091-1798
DOI:
10.1214/13-AOP897
发表日期:
2015
页码:
1350-1398
关键词:
heat kernel
potential-theory
conditional gauge
stable processes
SCHRODINGER-OPERATORS
harnack principle
perturbation
DIFFUSIONS
INEQUALITY
BOUNDARIES
摘要:
We introduce a class of Levy processes subject to specific regularity conditions, and consider their Feynman-Kac semigroups given under a Kato-class potential. Using new techniques, first we analyze the rate of decay of eigenfunctions at infinity. We prove bounds on lambda-subaveraging functions, from which we derive two-sided sharp pointwise estimates on the ground state, and obtain upper bounds on all other eigenfunctions. Next, by using these results, we analyze intrinsic ultracontractivity and related properties of the semigroup refining them by the concept of ground state domination and asymptotic versions. We establish the relationships of these properties, derive sharp necessary and sufficient conditions for their validity in terms of the behavior of the Levy density and the potential at infinity, define the concept of borderline potential for the asymptotic properties and give probabilistic and variational characterizations. These results are amply illustrated by key examples.