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Controlled branching processes with continuous time

Part of: Markov processes Special processes

Published online by Cambridge University Press:  16 September 2021

Miguel González Open the ORCID record for Miguel González [Opens in a new window] ,
Manuel Molina Open the ORCID record for Manuel Molina [Opens in a new window] ,
Ines del Puerto Open the ORCID record for Ines del Puerto [Opens in a new window] ,
Nikolay M. Yanev  and
George P. Yanev Open the ORCID record for George P. Yanev [Opens in a new window]
Miguel González*
Affiliation:
University of Extremadura
Manuel Molina*
Affiliation:
University of Extremadura
Ines del Puerto*
Affiliation:
University of Extremadura
Nikolay M. Yanev*
Affiliation:
Bulgarian Academy of Sciences
George P. Yanev*
Affiliation:
University of Texas RGV and Bulgarian Academy of Sciences
*
*Postal address: Department of Mathematics, Faculty of Sciences, University of Extremadura, 06006 Badajoz, Spain.
*Postal address: Department of Mathematics, Faculty of Sciences, University of Extremadura, 06006 Badajoz, Spain.
*Postal address: Department of Mathematics, Faculty of Sciences, University of Extremadura, 06006 Badajoz, Spain.
*****Postal address: Department of Operations Research, Probability and Statistics, Institute of Mathematics and Informatics, Bulgarian Academy of Sciences, 1113 Sofia, Bulgaria. Email address: yanev@math.bas.bg
******Postal address: The University of Texas Rio Grande Valley, School of Mathematical & Statistical Sciences, 1201 W. University Drive, Edinburg, TX 78539, USA. Email address: george.yanev@utrgv.edu
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Abstract

A class of controlled branching processes with continuous time is introduced and some limiting distributions are obtained in the critical case. An extension of this class as regenerative controlled branching processes with continuous time is proposed and some asymptotic properties are considered.

Keywords

Controlled branching processrenewal processregenerative processrandom time changelimit theorem

MSC classification

Primary: 60J80: Branching processes (Galton-Watson, birth-and-death, etc.)
Secondary: 60K05: Renewal theory 60J85: Applications of branching processes 60K10: Applications (reliability, demand theory, etc.)
Type
Original Article
Information
Journal of Applied Probability , Volume 58 , Issue 3 , September 2021 , pp. 830 - 848
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Copyright
© The Author(s), 2021. Published by Cambridge University Press on behalf of Applied Probability Trust

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References

Bingham, N. H., Goldie, C. M. and Teugels, J. L. (1986). Regular Variation. Cambridge University Press, Cambridge.Google Scholar
Dion, J. P. and Epps, T. (1999). Stock prices as branching processes in random environment: estimation. Commun. Statist. Simul. Comput. 28, 957975.CrossRefGoogle Scholar
Epps, T. (1996). Stock prices as branching processes. Commun. Statist. Stoch. Models 12, 529558.CrossRefGoogle Scholar
Feller, W. (1971). An Introduction to Probability Theory and its Applications, Vol. 2, 2nd edn. John Wiley, New York.Google Scholar
Gao, Z. (2018). Berry–Esseen type inequality for a Poisson randomly indexed branching process via Stein’s method. J. Math. Inequal. 12, 573582.Google Scholar
Gao, Z. and Wang, W. (2015). Large deviations for a Poisson random indexed branching process. Statist. Prob. Lett. 105, 143148.CrossRefGoogle Scholar
Gao, Z. and Wang, W. (2016). Large and moderate deviations for a renewal randomly indexed branching process. Statist. Prob. Lett. 116, 139145.CrossRefGoogle Scholar
Gao, Z. and Zhang, Y. (2015). Large and moderate deviations for a class of renewal random indexed branching processes. Statist. Prob. Lett. 103, 15.CrossRefGoogle Scholar
Gao, Z. and Zhang, Y. (2016). Limit theorems for a supercritical Poisson random indexed branching process. J. Appl. Prob. 53, 307314.CrossRefGoogle Scholar
González, M., Molina, M. and del Puerto, I. (2005). Asymptotic behaviour for critical controlled branching processes with random control function. J. Appl. Prob. 42, 463477.CrossRefGoogle Scholar
González, M., del Puerto, I. and Yanev, G. P. (2018). Controlled Branching Processes. ISTE, and John Wiley, London.10.1002/9781119452973CrossRefGoogle Scholar
Huillet, T. E. (2016). On Mittag–Leffler distributions and related stochastic processes. J. Comput. Appl. Math. 296, 181211.CrossRefGoogle Scholar
Mallor, F. and Omey, E. A. M. (2006). Univariate and Multivariate Weighted Renewal Theory. Public University of Navarre, Pamplona.CrossRefGoogle Scholar
Mitov, G. K. and Mitov, K. V. (2006). Randomly indexed branching processes. In Proceedings of the 35th Spring Conference of UBM, pp. 275–281. Sofia.Google Scholar
Mitov, G. K. and Mitov, K. V. (2007). Option pricing by branching processes. Pliska Stud. Math. Bulgar. 18, 213224.Google Scholar
Mitov, G. K., Mitov, K. V. and Yanev, N. M. (2009). Critical randomly indexed branching processes. Statist. Prob. Lett. 79, 15121521.CrossRefGoogle Scholar
Mitov, G. K., Rachev, S. T., Kim, Y. S. and Fabozzi, F. (2009). Barrier option pricing by branching processes. Internat. J. Theor. Appl. Finance 12, 10551073.CrossRefGoogle Scholar
Mitov, K. V. and Mitov, G. K. (2011). Subcritical randomly indexed branching processes. Pliska Stud. Math. Bulgar. 20, 155168.Google Scholar
Mitov, K. V. and Yanev, N. M. (2001). Regenerative processes in the infinite mean cycle case. J. Appl. Prob. 38, 165179.CrossRefGoogle Scholar
Mitov, K. V. and Yanev, N. M. (2016). Limiting distributions for alternating regenerative branching processes. C. R. Acad. Bulgare Sci. 69, 12511262.Google Scholar
Mitov, K. V., Mitov, G. K. and Yanev, N. M. (2010). Limit theorems for critical randomly indexed branching processes. In Workshop on Branching Processes and Their Applications (Lecture Notes Statist. 197), eds M. González et al., pp. 95–108. Springer.CrossRefGoogle Scholar
Molina, M. and Yanev, N. M. (2003). Continuous time bisexual branching processes. C. R. Acad. Bulgare Sci. 56, 510.Google Scholar
Serfozo, R. (1982). Convergence of Lebesgue integrals with varying measures. Sankhyā A 44, 380402.Google Scholar
Yanev, G. P. and Yanev, N. M. (1995) Critical branching processes with random migration. In Branching Processes (Proceedings of the First World Congress) (Lecture Notes Statist. 99), ed. C. C. Heyde, pp. 36–46. Springer, New York.Google Scholar
Yanev, G. P. and Yanev, N. M. (1997). Limit theorems for branching processes with random migration stopped at zero. In Classical and Modern Branching Processes (The IMA Volumes in Mathematics and its Applications 84), eds K. Athreya and P. Jagers, pp. 323–336. Springer, New York.CrossRefGoogle Scholar