MCKEAN-VLASOV EQUATIONS INVOLVING HITTING TIMES: BLOW-UPS AND GLOBAL SOLVABILITY
成果类型:
Article
署名作者:
Bayraktar, Erhan; Guo, Gaoyue; Tang, Wenpin; Zhang, Yuming Paul
署名单位:
University of Michigan System; University of Michigan; Universite Paris Saclay; Universite Paris Saclay; Columbia University; University of California System; University of California San Diego
刊物名称:
ANNALS OF APPLIED PROBABILITY
ISSN/ISSBN:
1050-5164
DOI:
10.1214/23-AAP1999
发表日期:
2024
页码:
1600-1622
关键词:
fire model
integrate
systems
摘要:
This paper is concerned with the analysis of blow-ups for two McKean-Vlasov equations involving hitting times. Let (B(t); t >= 0) be standard Brownian motion, and tau := inf{t >= 0 : X(t) <= 0} be the hitting time to zero of a given process X. The first equation is X(t) = X(0-) + B(t) - alpha P(tau <= t). We provide a simple condition on a and the distribution of X(0-) such that the corresponding Fokker-Planck equation has no blow-up, and thus the McKean-Vlasov dynamics is well defined for all time t >= 0. Our approach relies on a connection between the McKean-Vlasov equation and the supercooled Stefan problem, as well as several comparison principles. The second equation is X(t) = X(0-)+ beta t + B(t)+ alpha lnP(tau > t), t >= 0, whose FokkerPlanck equation is nonlocal. We prove that for beta > 0 sufficiently large and alpha no greater than a sufficiently small positive constant, there is no blow-up and the McKean-Vlasov dynamics is well defined for all time t >= 0. The argument is based on a new transform, which removes the nonlocal term, followed by a relative entropy analysis.