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A mathematical model of an oil and gas field development process

Published online by Cambridge University Press:  08 March 2010

C. ATKINSON  and
R. ISANGULOV
C. ATKINSON
Affiliation:
Department of Mathematics, Imperial College of Science, London, UK
R. ISANGULOV
Affiliation:
Schlumberger Cambridge Research, Cambridge, UK email: rustam.isangulov@slb.com
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Abstract

A mathematical model of the development of an oil and gas field is presented. The field development process is treated as sequential in nature. Completion of a well and its production are considered to be random processes. The model uses results from renewal theory where the completion of a well and failure to produce economical amount of oil or gas are analogous to the failure of a component. In principle, the theory described can give the complete probability distribution associated with a field development. Explicit expressions are given for the expected value and variance of the number of completed wells.

Type
Papers
Information
European Journal of Applied Mathematics , Volume 21 , Issue 3 , June 2010 , pp. 205 - 227
Copyright
Copyright © Cambridge University Press 2010

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References

[1]Adams, A. J., Gibson, C. & Smith, R. (2009) Probabilistic well time estimation revisited. In: SPE 119287, SPE/IADC Drilling Conference and Exhibition, Amsterdam.Google Scholar
[2]Aldred, W., Belaskie, J., Isangulov, R., Crockett, B., Edmondson, B., Florence, F. & Srinivasan, S. (2005) Changing the way we drill. Oilfield Rev. 17 (1), 4249.Google Scholar
[3]Alhanai, W. T. (2002) Management and control of the inventory of problematic wells: A stochastic process. In: SPE 78554, 10th Abu Dhabi International Petroleum Exhibition and Conference, 1316 October, 2002, Abu Dhabi, UAE.Google Scholar
[4]Brett, J. F. & Millheim, K. K. (1986) The drilling performance curve: A yardstick for judging drilling performance. In: SPE 15362, 61st Annual Technical Conference and Exhibition of the Society of Petroleum Engineers, 58 October, 1986, New Orleans, USA.Google Scholar
[5]Cox, D. R. & Smith, W. L. (1961) Queues, Chapman & Hall/CRC, CRC Press LLC, 2000 N.W. Corporate Blod, Boca Raton, Florida 33431, USA.Google Scholar
[6]Walter, L. S. (1958) Renewal theory and its ramifications. J. R. Stat. Soc. 20 (2), 243302.Google Scholar
[7]Hormann, W., Leydold, L. & Derflinger, G. (2004) Automatic Nonuniform Random Variate Generation, Springer, New York.CrossRefGoogle Scholar