Asymptotic Properties of Permanental Sequences
Related to Birth and Death Processes and Autoregressive Gaussian Sequences
Michael B Marcus author Jay Rosen author
Format:Paperback
Publisher:Springer Nature Switzerland AG
Published:31st Mar '21
Currently unavailable, and unfortunately no date known when it will be back
This SpringerBriefs employs a novel approach to obtain the precise asymptotic behavior at infinity of a large class of permanental sequences related to birth and death processes and autoregressive Gaussian sequences using techniques from the theory of Gaussian processes and Markov chains.
The authors study alpha-permanental processes that are positive infinitely divisible processes determined by the potential density of a transient Markov process. When the Markov process is symmetric, a 1/2-permanental process is the square of a Gaussian process. Permanental processes are related by the Dynkin isomorphism theorem to the total accumulated local time of the Markov process when the potential density is symmetric, and by a generalization of the Dynkin theorem by Eisenbaum and Kaspi without requiring symmetry. Permanental processes are also related to chi square processes and loop soups.The book appeals to researchers and advanced graduate students interested in stochastic processes, infinitely divisible processes and Markov chains.
ISBN: 9783030694845
Dimensions: unknown
Weight: unknown
114 pages
1st ed. 2021