The joint distribution of X and N, where N has a geometric distribution and X is the sum of N IID exponential variables (independent of N), is infinitely divisible. This leads to a bivariate Levy process {(X(t), N(t)), t >= 0}, whose coordinates are correlated negative binomial and gamma processes. We derive basic properties of this process, including its covariance structure, representations, and stochastic self-similarity. We examine the joint distribution of (X(t), N(t)) at a fixed time t, along with the marginal and conditional distributions, joint integral transforms, moments, infinite divisibility, and stability with respect to random summation. We also discuss maximum likelihood estimation and simulation for this model
Abstract. The geometric distribution leads to a Lévy process parame-terized by the probability of su...
The generalised Ornstein-Uhlenbeck process constructed from a bivariate Lévy process (ξt, ηt) t≥0 is...
By developing data augmentation methods unique to the negative binomial (NB) distribution, we unite ...
The joint distribution of X and N, where N has a geometric distribution and X is the sum of N IID ex...
In this article we introduce a three-parameter extension of the bivariate expo-nential-geometric (BE...
AbstractIn this article we introduce a three-parameter extension of the bivariate exponential-geomet...
The geometric distribution leads to a Lévy process parameterized by the probability of success. The ...
We study the concept of self-similarity with respect to stochastic time change. The negative binomia...
The joint distribution of the maximum loss and the maximum gain is obtained for a spectrally negativ...
AbstractA new class of stochastic processes, called processes of positive bivariate type, is defined...
The joint distribution of the maximum loss and the maximum gain is obtained for a spectrally negativ...
AbstractNegative binomial point processes are defined for which all finite-dimensional distributions...
AbstractWe introduce two new bivariate gamma distributions based on a characterizing property involv...
SUMMARY. We derive bivariate exponential distributions using independent auxil-iary random variables...
Thesis (Ph.D.)--Boston UniversityPLEASE NOTE: Boston University Libraries did not receive an Authori...
Abstract. The geometric distribution leads to a Lévy process parame-terized by the probability of su...
The generalised Ornstein-Uhlenbeck process constructed from a bivariate Lévy process (ξt, ηt) t≥0 is...
By developing data augmentation methods unique to the negative binomial (NB) distribution, we unite ...
The joint distribution of X and N, where N has a geometric distribution and X is the sum of N IID ex...
In this article we introduce a three-parameter extension of the bivariate expo-nential-geometric (BE...
AbstractIn this article we introduce a three-parameter extension of the bivariate exponential-geomet...
The geometric distribution leads to a Lévy process parameterized by the probability of success. The ...
We study the concept of self-similarity with respect to stochastic time change. The negative binomia...
The joint distribution of the maximum loss and the maximum gain is obtained for a spectrally negativ...
AbstractA new class of stochastic processes, called processes of positive bivariate type, is defined...
The joint distribution of the maximum loss and the maximum gain is obtained for a spectrally negativ...
AbstractNegative binomial point processes are defined for which all finite-dimensional distributions...
AbstractWe introduce two new bivariate gamma distributions based on a characterizing property involv...
SUMMARY. We derive bivariate exponential distributions using independent auxil-iary random variables...
Thesis (Ph.D.)--Boston UniversityPLEASE NOTE: Boston University Libraries did not receive an Authori...
Abstract. The geometric distribution leads to a Lévy process parame-terized by the probability of su...
The generalised Ornstein-Uhlenbeck process constructed from a bivariate Lévy process (ξt, ηt) t≥0 is...
By developing data augmentation methods unique to the negative binomial (NB) distribution, we unite ...