Analytical Solution of Kolmogorov Equations for Four-Condition Homogenous, Symmetric and Ergodic System

作     者：Victor V. Kravets Konstantin M. Bass Vladimir V. Kravets Larisa A. Tokar 

作者机构：Department of Automobiles and Automobile Sector National Mining University Dnepropetrovsk Ukraine Foreign Languages Department National Mining University Dnepropetrovsk Ukraine 

出 版 物：《Open Journal of Applied Sciences》 (应用科学（英文）)

年 卷 期：2014年第4卷第10期

页      面：497-500页

学科分类：07[理学] 0701[理学-数学] 070101[理学-基础数学] 

主　　题：State Graph Markovian Process Kolmogorov Equations Intensity Matrix Characteristic Equations State Probabilities 

摘      要：Technical system consisting of two independent subsystems (e.g. hybrid car) is considered. Graduated state graph being homogenous ergodic system of symmetric structure is constructed for the system. Differential Kolmogorov equations, describing homogenous Markovian processes with discrete states and continuous time, are listed in symmetric matrix form. Properties of symmetry of matrix of subsystem failure and recovery flow intensity are analyzed. Dependences of characteristic equation coefficients on intensity of failure and recovery flows are obtained. It is demonstrated that the coefficients of characteristic equation meet the demands of functional dependence matching proposed visible analytical solution of complete algebraic equation of fourth order. Depending upon intensity of failure and recovery flows, four roots of characteristic equation are analytically found out. Analytical formulae for state probability of interactive technical system depending upon the roots of characteristic equation are determined using structurally ordered symmetric determinants, involving proper column of set initial data as well as subsystem failure and recovery flow intensity are proposed.