INSTITUTIONAL DIGITAL REPOSITORY

Fractional Poisson Processes of Order k and Beyond

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dc.contributor.author Gupta, N
dc.contributor.author Kumar, A
dc.date.accessioned 2024-05-11T10:35:55Z
dc.date.available 2024-05-11T10:35:55Z
dc.date.issued 2024-05-11
dc.identifier.uri http://dspace.iitrpr.ac.in:8080/xmlui/handle/123456789/4451
dc.description.abstract Abstract: In this article, we introduce fractional Poisson fields of order k in n-dimensional Euclidean space of positive real valued vectors. We also work on time-fractional Poisson process of order k, space-fractional Poisson processes of order k and a tempered version of time-space fractional Poisson processes of order k. We discuss generalized fractional Poisson processes of order k in terms of Bernstein functions. These processes are defined in terms of fractional compound Poisson processes. The time-fractional Poisson process of order k naturally generalizes the Poisson process and the Poisson process of order k to a heavy-tailed waiting-times counting process. The space-fractional Poisson process of order k allows on average an infinite number of arrivals in any interval. We derive the marginal probabilities governing difference–differential equations of the introduced processes. We also provide the Watanabe martingale characterization for some time-changed Poisson processes. en_US
dc.language.iso en_US en_US
dc.subject Time-fractional Poisson process en_US
dc.subject · Poisson process of order k en_US
dc.subject Space-fractional Poisson process en_US
dc.subject Infinite divisibility en_US
dc.subject Homogeneous Poisson field en_US
dc.title Fractional Poisson Processes of Order k and Beyond en_US
dc.type Article en_US


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