×

zbMATH — the first resource for mathematics

Stochastic theory of compartments: One and two compartment systems. (English) Zbl 0288.92005

MSC:
92B05 General biology and biomathematics
60K30 Applications of queueing theory (congestion, allocation, storage, traffic, etc.)
PDF BibTeX XML Cite
Full Text: DOI
References:
[1] Bartholomay, A. F. 1958. ”Stochastic Models for Chemical Reactions: I. Theory of the Unimolecular Reaction Process.”Bull. Math. Biophysics,20, 176–190.
[2] Cardenas, M. and J. H. Matis. 1974. ”On the Stochastic Theory of Compartments: Solution ofn-Compartment Systems with Irreversible, Time Dependent Transition Probabilities.”Bull. Math. Biology,36, 489–504. · Zbl 0293.92014
[3] Matis, J. H. and H. O. Hartley. 1971. ”Stochastic Compartmental Analysis: Model and Least Squares Estimation from Time Series Data.”Biometrics,27, 77–102.
[4] Mirasol, N. M. 1963. ”The Output of anM|G| Queueing System is Poisson.”Ops. Res.,11, 282–284. · Zbl 0114.09401
[5] Purdue, P. 1974. ”Stochastic Theory of Compartments.”Bull. Math. Biology,36, 305–309. · Zbl 0302.60062
[6] Thakur, A. K., A. Rescigno and D. E. Schafer. ”On the Stochastic Theory of Compartments: I. A Single Compartment System.”Bull. Math. Biophysics,34, 53–63. · Zbl 0232.92008
[7] —- and –. 1974. ”On the Stochastic Theory of Compartments: II. Multi-Compartment Systems.”Bull. Math. Biology,35, 263–271. · Zbl 0258.92002
[8] Takács, L. 1962.Introduction to the Theory of Queues. New York: Oxford University Press. · Zbl 0106.33502
This reference list is based on information provided by the publisher or from digital mathematics libraries. Its items are heuristically matched to zbMATH identifiers and may contain data conversion errors. It attempts to reflect the references listed in the original paper as accurately as possible without claiming the completeness or perfect precision of the matching.