STOCHASTIC METHODS FOR THE NEUTRON TRANSPORT EQUATION I: LINEAR SEMIGROUP ASYMPTOTICS
成果类型:
Article
署名作者:
Horton, Emma; Kyprianou, Andreas E.; Villemonais, Denis
署名单位:
Universite de Lorraine; University of Bath
刊物名称:
ANNALS OF APPLIED PROBABILITY
ISSN/ISSBN:
1050-5164
DOI:
10.1214/20-AAP1567
发表日期:
2020
页码:
2573-2612
关键词:
markovian processes
CONVERGENCE
STABILITY
criteria
operator
spectrum
摘要:
The neutron transport equation (NTE) describes the flux of neutrons through an inhomogeneous fissile medium. In this paper, we reconnect the NTE to the physical model of the spatial Markov branching process which describes the process of nuclear fission, transport, scattering, and absorption. By reformulating the NTE in its mild form and identifying its solution as an expectation semigroup, we use modern techniques to develop a Perron-Frobenius (PF) type decomposition, showing that growth is dominated by a leading eigenfunction and its associated left and right eigenfunctions. In the spirit of results for spatial branching and fragmentation processes, we use our PF decomposition to show the existence of an intrinsic martingale and associated spine decomposition. Moreover, we show how criticality in the PF decomposition dictates the convergence of the intrinsic martingale. The mathematical difficulties in this context come about through unusual piecewise linear motion of particles coupled with an infinite type-space which is taken as neutron velocity. The fundamental nature of our PF decomposition also plays out in accompanying work (Harris, Horton and Kyprianou (2020), Cox et al. (2020)).