Laplace motion is a Levy process built upon Laplace distributions. Non Gaussian stochastic fields that are integrals with respect to this process are considered and methods for their model fitting are discussed. The proposed procedures allow for inference about the parameters of the underlying Laplace distributions. A fit of dependence structure is also addressed. The importance of a convenient parameterization that admits natural and consistent estimation for this class of models is emphasized. Several parameterizations are introduced and their advantages over one another discussed. The proposed estimation method targets the standard characteristics: mean, variance, skewness and kurtosis. Their sample equivalents are matched in the closest...
Slepian models are derived for a stochastic process observed at level crossings of a moving average ...
Wetackle the modeling of threshold exceedances in asymptotically independent stochastic processes by...
In this paper we introduce a new class of state space models based on shot-noise simulation represen...
Skew Laplace distributions, which naturally arise in connection with random summation and quantile r...
This thesis is based on five papers (A-E) treating estimation methods for unbounded densities, rando...
The article studies non-Gaussian extensions of a recently discovered link between certain Gaussian r...
Multivariate Laplace distribution is an important stochastic model that accounts for asymmetry and h...
The article studies non-Gaussian extensions of a recently discovered link between certain Gaussian r...
AbstractMultivariate Laplace distribution is an important stochastic model that accounts for asymmet...
Abstract. The parameter estimation theory for stochastic dierential equa-tions driven by Brownian mo...
Many records in environmental science exhibit asymmetries: for example in shallow water and with var...
We carry on an exploration of Lévy processes, focusing on instrumental definitions that ease our way...
AbstractWe construct the Laplace approximation of the Lebesgue density for a discrete partial observ...
This paper is a continuation of cite{KP06}, where we discussed the origins and inter-relations of ma...
Slepian models are derived for a stochastic process observed at level crossings of a moving average ...
Slepian models are derived for a stochastic process observed at level crossings of a moving average ...
Wetackle the modeling of threshold exceedances in asymptotically independent stochastic processes by...
In this paper we introduce a new class of state space models based on shot-noise simulation represen...
Skew Laplace distributions, which naturally arise in connection with random summation and quantile r...
This thesis is based on five papers (A-E) treating estimation methods for unbounded densities, rando...
The article studies non-Gaussian extensions of a recently discovered link between certain Gaussian r...
Multivariate Laplace distribution is an important stochastic model that accounts for asymmetry and h...
The article studies non-Gaussian extensions of a recently discovered link between certain Gaussian r...
AbstractMultivariate Laplace distribution is an important stochastic model that accounts for asymmet...
Abstract. The parameter estimation theory for stochastic dierential equa-tions driven by Brownian mo...
Many records in environmental science exhibit asymmetries: for example in shallow water and with var...
We carry on an exploration of Lévy processes, focusing on instrumental definitions that ease our way...
AbstractWe construct the Laplace approximation of the Lebesgue density for a discrete partial observ...
This paper is a continuation of cite{KP06}, where we discussed the origins and inter-relations of ma...
Slepian models are derived for a stochastic process observed at level crossings of a moving average ...
Slepian models are derived for a stochastic process observed at level crossings of a moving average ...
Wetackle the modeling of threshold exceedances in asymptotically independent stochastic processes by...
In this paper we introduce a new class of state space models based on shot-noise simulation represen...