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Stochastic modelling of flexible manufacturing systems. (English) Zbl 0800.90541

90B30 Production models
Full Text: DOI
[1] Ranky, P.G., The design and operation of flexible manufacturing systems, (1983), IFS Publications and North-Holland
[2] ()
[3] Flexible manufacturing systems handbook, (1984), Noyes Publications Park Ridge, New Jersey
[4] Ho, Y.C., Dynamics of discrete event systems, Proceedings of the IEEE, 77, 1, (January, 1989), Special Issue of
[5] Suri, R., An overview of evaluative models for flexible manufacturing systems, Annals of operations research, 3, 13-21, (1985)
[6] Trivedi, K.S., Probability and statistics with reliability, queueing and computer science applications, (1982), Prentice-Hall Inc Englewood Cliffs, N.J
[7] Marsan, M.A.; Balbo, G.; Conte, G., Performance models of multiprocessor systems, (1986), The MIT Press Cambridge, Massachusetts
[8] Ho, Y.C., Performance evaluation and perturbation analysis of discrete event systems, IEEE trans. automatic control, AC-32, 7, 563-572, (July, 1987)
[9] Buzacott, J.A., Modelling manufacturing systems, Robotics and computer integrated manufacturing, 2, 1, 25-32, (1985) · Zbl 0569.90030
[10] Suri, R., Quantitative techniques for robotic system analysis, (), 605-638
[11] Buzacott, J.A.; Yao, D.D., Flexible manufacturing systems: A review of analytical models, Management science, 32, 7, 890-905, (1986) · Zbl 0649.90061
[12] Narahari, Y.; Viswanadham, N., A Petri net approach to modelling and analysis of flexible manufacturing systems, Annals of operations research, 3, 449-472, (1985)
[13] Wonham, W.M., A control theory for discrete event systems, Systems control group report #8714, (December 1987)
[14] Inan, K.M.; Varaiya, P.P., Algebras of discrete event models, Proceedings of the IEEE, 77, 1, 24-38, (January, 1989)
[15] Bevans, J.P., First choose an FMS simulator, American machinist, 143-145, (May 1982)
[16] Elmaraghy, H.A., Simulation and graphical animation of advanced manufacturing systems, Journal of manufacturing systems, 1, 1, 53-64, (1982)
[17] Carrie, A.S., The role of simulation in FMS, (), 191-208
[18] Shantikumar, J.G.; Sargent, R.G., A hybrid simulation/analytic model of a computerized manufacturing system, Proc. IFORS conference, (1981), Hamburg, Germany · Zbl 0473.90042
[19] Ho, Y.C., A survey of perturbation analysis of discrete event dynamical systems, Annals of operations research, 3, 393-405, (1985)
[20] Suri, R., Perturbation analysis: the state of the art and research issues explained via G/G/1 queue, Proc. of IEEE, 77, 1, 114-137, (January 1989)
[21] Gershwin, S.B.; Berman, O., Analysis of transfer lines consisting of two unreliable machines with random processing times and finite storage buffers, AIIE transactions, 13, 1, 2-11, (March 1981)
[22] Gershwin, S.B.; Schick, I.C., Modelling and analysis of three-stage transfer lines with unreliable machines and finite buffers, Operations research, 31, 2, 354-380, (March-April 1983)
[23] Buzacott, J.A.; Shantikumar, J.G., Models for understanding flexible manufacturing systems, AIIE transactions, 12, 4, 339-349, (December 1980)
[24] Foster, J.W.; Garcia-Diaz, A., Markovian models for investigating failure and repair characteristics of production systems, IIE transactions, 15, 202-210, (1983)
[25] Alam, M.; Gupta, D.; Ahmad, S.I.; Raouf, A., Performance modelling and evaluation of flexible manufacturing systems using semi-Markov approach, (), 87-118
[26] Ammar, M.H., Performance of a two stage manufacturing system with control and communication overhead, IEEE trans. systems, man, and cybernetics, SMC-17, 4, 661-665, (July-August 1987)
[27] Curtois, P.J., Decomposability: queueing and computer systems applications, (1987), Academic Press New York
[28] Buzacott, J.A.; Yao, D.D., On queueing network models of flexible manufacturing systems, Queueing systems, 1, 5-27, (1986) · Zbl 0649.90061
[29] Suri, R.; Hildebrant, R.R., Modelling flexible manufacturing systems using Mean value analysis, Journal of manufacturing systems, 3, 1, 27-38, (1984)
[30] Seidman, A.; Schweitzer, P.J.; Shalev-Oren, S., Computerized closed queueing network models of flexible manufacturing systems: A comparative evaluation, Large scale systems, 12, 91-107, (1987) · Zbl 0644.90046
[31] Solberg, J.J., A mathematical model of computerized manufacturing systems, Proc. fourth international conference on production research, (1977), Tokyo
[32] Stecke, K.E.; Solberg, J.J., The optimality of unbalancing both work-loads and machine group sizes in closed queueing networks of multi-server queues, Operations research, 33, 882-910, (1985) · Zbl 0584.90022
[33] Balbo, G.; Chiola, G.; Franceschinis, G.; Roet, G.M., Generalized stochastic Petri nets for performance evaluation of FMS, Proc. of 1987 IEEE conference on robotics & automation, 1013-1018, (March 1987)
[34] Cavaille, J.B.; Dubois, D., Heuristic methods based on Mean value analysis for flexible manufacturing systems performance evaluation, Proc. 21st IEEE conf. decision & control, 1061-1065, (1982), Florida
[35] Shalev-Oren, S.; Seidman, A.; Schweitzer, P.J., Analysis of flexible manufacturing systems with priority scheduling: PMVA, Annals of operations research, 3, 115-128, (1985)
[36] Buzacott, J.A.; Shantikumar, J.G., On approximate queueing models of dynamic job shops, Management science, 31, 870-887, (1985)
[37] Shantikumar, J.G.; Buzacott, J.A., Open queueing network models of dynamic job shops, International journal of production research, 19, 255-266, (1981)
[38] Coffman, E.G.; Gelenbe, E.; Gilbert, E.N., Analysis of a conveyor queueing a flexible manufacturing system, Proc. 1986 ACM SIGMETRICS conf. on measurement and modelling of computer systems, 204-223, (1986)
[39] Kamath, M.; Sanders, J.L., Analytical methods for performance evaluation of large asynchronous automatic assembly systems, Large scale systems, 12, 143-154, (1987) · Zbl 0709.90557
[40] Dubois, D.; Stecke, K.E., Using Petri nets to represent production processes, Proc. of the 22nd IEEE conference on decision & control, 1062-1067, (1983), San Antonio, Texas
[41] Cohen, G.; Dubois, D.; Quadrat, J.P.; Viot, M., A linear system theoretic view of discrete event processes and its use for performance evaluation in manufacturing, IEEE trans. automatic control, AC-30, 3, 210-220, (March 1985)
[42] Bruno, G.; Biglia, P., Performance evaluation and validation of tool handling in flexible manufacturing systems using Petri nets, Proc. of international workshop on timed Petri nets, 64-71, (July 1985), Torino, Italy
[43] Viswanadham, N.; Narahari, Y., Stochastic Petri net models for performance evaluation of automated manufacturing systems, Information and decision technologies, 14, 125-142, (1988) · Zbl 0677.68119
[44] Marsan, M.A.; Balbo, G.; Chiola, G.; Conte, G., Generalized stochastic Petri nets revisited: random switches and priorities, Proc. international workshop on Petri nets and performance models, 43-53, (August 1987), Madison, Wisconsin
[45] Archetti, F.; Fagiuoli, E.; Sciomachen, A., Computation of the makespan in a transfer line with station breakdowns using stochastic Petri nets, Computers and operations research, (1987) · Zbl 0623.90033
[46] Hillion, H.P.; Proth, J.M., Performance evaluation of job-shop systems using timed event graphs, IEEE trans. automatic control, AC-34, 1, 3-9, (January 1989)
[47] Vernon, M.K.; Zahorjan, J.; Lazowska, E.D., A comparison of performance Petri nets and queueing network models, (), 181-192
[48] Balbo, G.; Bruell, S.C.; Ghanta, S., Combining queueing network and generalized stochastic Petri nets for the analysis of software blocking phenomena, IEEE trans. software engineering, SE-12, 4, 561-576, (April 1986)
[49] Coffman, E.G.; Elphick, M.J.; Shoshani, A., System deadlocks, ACM computing surveys, 3, 2, 67-78, (June 1971)
[50] Alla, H.; Ladet, P.; Martinez, P.; Silva, M., Modelling and validation of complex systems by coloured Petri nets: application to FMS, (), 15-31, Lecture Notes in Computer Science · Zbl 0617.68058
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