A new probabilistic approach to the path criticality in stochastic PERT

The notion of critical path is a key issue in the temporal analysis of project scheduling in deterministic setting. The very essence of the CPM consists in identifying the critical path, i.e., the longest path in a project network, because this path conveys information on how long it should take to complete the project to the project manager. The problem how can a stochastic counterpart of the deterministic critical path be defined is an important question in stochastic PERT. However, in the literature of stochastic PERT this question has so far almost been ignored, and the research into the random nature of a project duration has mainly been concentrated on the completion time in stochastic PERT in which any concrete special path is not specified. In the present paper we attempt to take first steps to fill this gap. We first developed a probabilistic background theory for univariate and bivariate marginal distributions of path durations of stochastic PERT whose joint path durations are modelled by multivariate normal distribution. Then, a new probabilistic approach to the comparison of path durations is introduced, and based on this comparison we define the concept of probabilistically critical path as a stochastic counterpart of the deterministic critical path. Also, an illustrative simple example of PCP and numerical results on the established probability bounds are presented.

[1]  D. Malcolm,et al.  Application of a Technique for Research and Development Program Evaluation , 1959 .

[2]  R. Plackett A REDUCTION FORMULA FOR NORMAL MULTIVARIATE INTEGRALS , 1954 .

[3]  Tetsuo Iida,et al.  Computing bounds on project duration distributions for stochastic PERT networks , 2000 .

[4]  Tamás Szántai,et al.  New Bounds and Approximations for the Probability Distribution of the Length of the Critical Path , 2004 .

[5]  John R. Birge,et al.  Bounds on Expected Project Tardiness , 1995, Oper. Res..

[6]  T. W. Anderson,et al.  An Introduction to Multivariate Statistical Analysis , 1959 .

[7]  S. S. Hashemin,et al.  A new analytical algorithm and generation of Gaussian quadrature formula for stochastic network , 1999, Eur. J. Oper. Res..

[8]  J. J. Martin Distribution of the Time Through a Directed, Acyclic Network , 1965 .

[9]  Bajis M. Dodin,et al.  Bounding the Project Completion Time Distribution in PERT Networks , 1985, Oper. Res..

[10]  Salah E. Elmaghraby On criticality and sensitivity in activity networks , 2000, Eur. J. Oper. Res..

[11]  Ignacio E. Grossmann,et al.  The exact overall time distribution of a project with uncertain task durations , 2000, Eur. J. Oper. Res..

[12]  Terry Williams Criticality in Stochastic Networks , 1992 .

[13]  D. Monhor On the application of concentration function to the pert 1 , 1983 .

[14]  D. Slepian The one-sided barrier problem for Gaussian noise , 1962 .

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

[16]  T. W. Anderson The integral of a symmetric unimodal function over a symmetric convex set and some probability inequalities , 1955 .

[17]  E. Lehmann Some Concepts of Dependence , 1966 .

[18]  Amir Azaron,et al.  Bicriteria shortest path in networks of queues , 2006, Appl. Math. Comput..

[19]  F. B. Cowell,et al.  The Completion Time of PERT Networks , 1983 .

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

[21]  T. W. Anderson An Introduction to Multivariate Statistical Analysis , 1959 .