Add to ORKGIn this paper we extend to the multidimensional case the modified Poisson series representation of linear stochastic processes driven by α-stable innovations. The latter has been recently introduced in the literature and it involves a Gaussian approximation of the residuals of the series, via the exact characterization of their moments. This allows for Bayesian techniques for parameter or state inference that would not be available otherwise, due to the lack of a closed-form likelihood function for the α-stable distribution. Simulation results are presented to validate the introduced extension and the quality of the approximation of the distribution. Finally, we show an example of generation from the process
Different change-point type models encountered in statistical inference for stochastic processes giv...
© 2017 IEEE. We report the results of a series of numerical studies examining the convergence rate f...
AbstractWe study the simulation of stochastic processes defined as stochastic integrals with respect...
In this paper we study parameter estimation for time series with asymmetric α-stable innovations. Th...
In this paper we develop an approach to Bayesian Monte Carlo inference for skewed α-stable distribut...
In this paper we present Poisson sum series representations for α-stable (αS) random variables and a...
The α-stable distribution is highly intractable for inference because of the lack of a closed form d...
In this paper we present Poisson sum series representations for α-stable (αS) random variables and α...
In this paper we study parameter estimation for α-stable distribution parameters. The proposed appro...
Extreme values and skewness in time-series are often observed in engineering, financial and biologi...
We carry on an exploration of Lévy processes, focusing on instrumental definitions that ease our way...
We report the results of several theoretical studies into the convergence rate for certain random se...
A stochastically continuous process ξt, t≥­0, is said to be time-stable if the sum of n i....
In this paper we introduce a new class of state space models based on shot-noise simulation represen...
To monitor or control a stochastic dynamic system, we need to reason about its current state. Exact ...
Different change-point type models encountered in statistical inference for stochastic processes giv...
© 2017 IEEE. We report the results of a series of numerical studies examining the convergence rate f...
AbstractWe study the simulation of stochastic processes defined as stochastic integrals with respect...
In this paper we study parameter estimation for time series with asymmetric α-stable innovations. Th...
In this paper we develop an approach to Bayesian Monte Carlo inference for skewed α-stable distribut...
In this paper we present Poisson sum series representations for α-stable (αS) random variables and a...
The α-stable distribution is highly intractable for inference because of the lack of a closed form d...
In this paper we present Poisson sum series representations for α-stable (αS) random variables and α...
In this paper we study parameter estimation for α-stable distribution parameters. The proposed appro...
Extreme values and skewness in time-series are often observed in engineering, financial and biologi...
We carry on an exploration of Lévy processes, focusing on instrumental definitions that ease our way...
We report the results of several theoretical studies into the convergence rate for certain random se...
A stochastically continuous process ξt, t≥­0, is said to be time-stable if the sum of n i....
In this paper we introduce a new class of state space models based on shot-noise simulation represen...
To monitor or control a stochastic dynamic system, we need to reason about its current state. Exact ...
Different change-point type models encountered in statistical inference for stochastic processes giv...
© 2017 IEEE. We report the results of a series of numerical studies examining the convergence rate f...
AbstractWe study the simulation of stochastic processes defined as stochastic integrals with respect...