Stationary Distribution for a Stochastic System of Complexes Interacting Particles
| Authors: Kalinkin A.V. | Published: 14.09.2014 |
| Published in issue: #4(55)/2014 | |
| DOI: | |
| Category: Mathematics and Mechanics | |
| Keywords: Markov process, discrete states, stationary distribution, particle interaction | |
A stochastic system of particles of n different kinds T1,...,Tn interacting as complexes is considered. A state of the system is a n-dimensional vector а = (α1,..., αn) of Nn vector set with nonnegative integer components. This means that there is a group Sα consisting of α1 particles of the kind T1,..., and αn particles of the kind Tn. Sufficient conditions are given for the closed class of states which are achievable from a given state a. Necessary and sufficient conditions are given for a finite closed class of states. A stationary distribution of the Markov process for the closed class is derived and some particular cases - binomial and Poisson distributions are considered. Relation of the found stationary distribution and the microcanonical and canonical distributions has been established.
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