A continuous-state polynomial branching process. Li, P. Stochastic Processes and their Applications, 2018. ![A continuous-state polynomial branching process [link]](https://bibbase.org/img/filetypes/link.svg "link")
Paper doi abstract bibtex A continuous-state polynomial branching process is constructed as the pathwise unique solution of a stochastic integral equation with absorbing boundary condition. The process can also be obtained from a spectrally positive Lévy process through Lamperti type transformations. The extinction and explosion probabilities and the mean extinction and explosion times are computed explicitly. Some of those are also new for the classical linear branching process. We present necessary and sufficient conditions for the process to extinguish or explode in finite times. In the critical or subcritical case, we give a construction of the process coming down from infinity. Finally, it is shown that the continuous-state polynomial branching process arises naturally as the rescaled limit of a sequence of discrete-state processes.
@article{LI2018,
Abstract = {A continuous-state polynomial branching process is constructed as the pathwise unique solution of a stochastic integral equation with absorbing boundary condition. The process can also be obtained from a spectrally positive L{\'e}vy process through Lamperti type transformations. The extinction and explosion probabilities and the mean extinction and explosion times are computed explicitly. Some of those are also new for the classical linear branching process. We present necessary and sufficient conditions for the process to extinguish or explode in finite times. In the critical or subcritical case, we give a construction of the process coming down from infinity. Finally, it is shown that the continuous-state polynomial branching process arises naturally as the rescaled limit of a sequence of discrete-state processes.},
Author = {Pei-Sen Li},
Date-Added = {2019-02-26 09:29:58 -0600},
Date-Modified = {2019-02-26 09:29:58 -0600},
Doi = {https://doi.org/10.1016/j.spa.2018.08.013},
Issn = {0304-4149},
Journal = {Stochastic Processes and their Applications},
Keywords = {Branching process, Continuous-state, Polynomial branching, Stochastic integral equation, Lamperti transformation, Extinction, Explosion},
Title = {A continuous-state polynomial branching process},
Url = {http://www.sciencedirect.com/science/article/pii/S0304414918304538},
Year = {2018},
Bdsk-File-1 = {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},
Bdsk-Url-1 = {http://www.sciencedirect.com/science/article/pii/S0304414918304538},
Bdsk-Url-2 = {https://doi.org/10.1016/j.spa.2018.08.013}}
Downloads: 0
{"_id":"ymCgCz2ZkbJncnMke","bibbaseid":"li-acontinuousstatepolynomialbranchingprocess-2018","authorIDs":[],"author_short":["Li, P."],"bibdata":{"bibtype":"article","type":"article","abstract":"A continuous-state polynomial branching process is constructed as the pathwise unique solution of a stochastic integral equation with absorbing boundary condition. The process can also be obtained from a spectrally positive Lévy process through Lamperti type transformations. The extinction and explosion probabilities and the mean extinction and explosion times are computed explicitly. Some of those are also new for the classical linear branching process. We present necessary and sufficient conditions for the process to extinguish or explode in finite times. In the critical or subcritical case, we give a construction of the process coming down from infinity. Finally, it is shown that the continuous-state polynomial branching process arises naturally as the rescaled limit of a sequence of discrete-state processes.","author":[{"firstnames":["Pei-Sen"],"propositions":[],"lastnames":["Li"],"suffixes":[]}],"date-added":"2019-02-26 09:29:58 -0600","date-modified":"2019-02-26 09:29:58 -0600","doi":"https://doi.org/10.1016/j.spa.2018.08.013","issn":"0304-4149","journal":"Stochastic Processes and their Applications","keywords":"Branching process, Continuous-state, Polynomial branching, Stochastic integral equation, Lamperti transformation, Extinction, Explosion","title":"A continuous-state polynomial branching process","url":"http://www.sciencedirect.com/science/article/pii/S0304414918304538","year":"2018","bdsk-file-1":"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","bdsk-url-1":"http://www.sciencedirect.com/science/article/pii/S0304414918304538","bdsk-url-2":"https://doi.org/10.1016/j.spa.2018.08.013","bibtex":"@article{LI2018,\n\tAbstract = {A continuous-state polynomial branching process is constructed as the pathwise unique solution of a stochastic integral equation with absorbing boundary condition. The process can also be obtained from a spectrally positive L{\\'e}vy process through Lamperti type transformations. The extinction and explosion probabilities and the mean extinction and explosion times are computed explicitly. Some of those are also new for the classical linear branching process. We present necessary and sufficient conditions for the process to extinguish or explode in finite times. In the critical or subcritical case, we give a construction of the process coming down from infinity. Finally, it is shown that the continuous-state polynomial branching process arises naturally as the rescaled limit of a sequence of discrete-state processes.},\n\tAuthor = {Pei-Sen Li},\n\tDate-Added = {2019-02-26 09:29:58 -0600},\n\tDate-Modified = {2019-02-26 09:29:58 -0600},\n\tDoi = {https://doi.org/10.1016/j.spa.2018.08.013},\n\tIssn = {0304-4149},\n\tJournal = {Stochastic Processes and their Applications},\n\tKeywords = {Branching process, Continuous-state, Polynomial branching, Stochastic integral equation, Lamperti transformation, Extinction, Explosion},\n\tTitle = {A continuous-state polynomial branching process},\n\tUrl = {http://www.sciencedirect.com/science/article/pii/S0304414918304538},\n\tYear = {2018},\n\tBdsk-File-1 = {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},\n\tBdsk-Url-1 = {http://www.sciencedirect.com/science/article/pii/S0304414918304538},\n\tBdsk-Url-2 = {https://doi.org/10.1016/j.spa.2018.08.013}}\n\n","author_short":["Li, P."],"key":"LI2018","id":"LI2018","bibbaseid":"li-acontinuousstatepolynomialbranchingprocess-2018","role":"author","urls":{"Paper":"http://www.sciencedirect.com/science/article/pii/S0304414918304538"},"keyword":["Branching process","Continuous-state","Polynomial branching","Stochastic integral equation","Lamperti transformation","Extinction","Explosion"],"downloads":0},"bibtype":"article","biburl":"https://www.matem.unam.mx/~geronimo/GenBib.bib","creationDate":"2020-02-05T22:46:28.185Z","downloads":0,"keywords":["branching process","continuous-state","polynomial branching","stochastic integral equation","lamperti transformation","extinction","explosion"],"search_terms":["continuous","state","polynomial","branching","process","li"],"title":"A continuous-state polynomial branching process","year":2018,"dataSources":["nrXzNrxsNEnPJbYnT"]}