INTERSECTION LOCAL-TIMES OF ALL ORDERS FOR BROWNIAN AND STABLE DENSITY PROCESSES - CONSTRUCTION, RENORMALIZATION AND LIMIT LAWS
成果类型:
Article
署名作者:
ADLER, RJ; ROSEN, JS
署名单位:
City University of New York (CUNY) System; College of Staten Island (CUNY)
刊物名称:
ANNALS OF PROBABILITY
ISSN/ISSBN:
0091-1798
DOI:
10.1214/aop/1176989283
发表日期:
1993
页码:
1073-1123
关键词:
motion
EQUATIONS
SYSTEM
摘要:
The Brownian and stable density processes are distribution valued processes that arise both via limiting operations on infinite collections of Brownian motions and stable Levy processes and as the solutions of certain stochastic partial differential equations. Their (self-) intersection local times (ILT's) of various orders can be defined in a manner somewhat akin to that used to define the self-intersection local times of simple R(d)-valued processes; that is, via a limiting operation involving approximate delta functions. We obtain a full characterisation of this limiting procedure, determining precisely in which cases we have convergence and deriving the appropriate renormalisation for obtaining weak convergence when only this is available. We also obtain results of a fluctuation nature, that describe the rate of convergence in the former case. Our results cover all dimensions and all levels of self-intersection.