Constant Access Systems: A General Framework for Greedy Optimization on Stochastic Networks

We consider network optimization problems in which the weights of the edges are random variables. We develop conditions on the combinatorial structure of the problem which guarantee that the objective function value is a first passage time in an appropriately constructed continuous time Markov chain. The arc weights must be distributed exponentially, the method of solution of the deterministic problem must be greedy in a general sense, and the accumulation of objective function value during the greedy procedure must occur at a constant rate. We call these structures constant access systems after the third property. Examples of constant access systems include the shortest path system, the longest path system, the time until disconnection in a network of failing components, and some bottleneck optimization problems. For each system, we give the distribution of the objective function, the distribution of the solution of the problem, and the probability that a given arc is a member of the optimal solution. We...

[1]  V. G. Kulkarni,et al.  Shortest paths in networks with exponentially distributed arc lengths , 1986, Networks.

[2]  H. Frank,et al.  Shortest Paths in Probabilistic Graphs , 1969, Oper. Res..

[3]  B. Korte,et al.  Greedoids and Linear Objective Functions , 1984 .

[4]  George S. Fishman,et al.  The Distribution of Maximum Flow with Applications to Multistate Reliability Systems , 1987, Oper. Res..

[5]  Oded Berman,et al.  The Constrained Bottleneck Problem in Networks , 1990, Oper. Res..

[6]  Rolf Schassberger,et al.  On the Equilibrium Distribution of a Class of Finite-State Generalized Semi-Markov Processes , 1976, Math. Oper. Res..

[7]  James J. Solberg,et al.  The use of cutsets in Monte Carlo analysis of stochastic networks , 1979 .

[8]  Salah E. Elmaghraby,et al.  Activity networks: Project planning and control by network models , 1977 .

[9]  G. Thompson,et al.  Critical Path Analyses Via Chance Constrained and Stochastic Programming , 1964 .

[10]  V. Kulkarni,et al.  Maximum Flow in Planar Networks with Exponentially Distributed Arc Capacities. , 1985 .

[11]  Vidyadhar G. Kulkarni,et al.  Markov and Markov-Regenerative pert Networks , 1986, Oper. Res..

[12]  Gideon Weiss,et al.  Stochastic bounds on distributions of optimal value functions with applications to pert, network flows and reliability , 1984, Oper. Res..

[13]  David W. Walkup,et al.  On the Expected Value of a Random Assignment Problem , 1979, SIAM J. Comput..

[14]  E. Höpfinger,et al.  On the Exact Evaluation of Finite Activity Networks with Stochastic Durations of Activities , 1976 .

[15]  Alon Itai,et al.  Maximum Flow in Planar Networks , 1979, SIAM J. Comput..