This thesis considers the interplay between the continuous and discrete properties of random stochastic processes. It is shown that the special cases of the one-sided Lévy-stable distributions can be connected to the class of discrete-stable distributions through a doubly-stochastic Poisson transform. This facilitates the creation of a one-sided stable process for which the N-fold statistics can be factorised explicitly. The evolution of the probability density functions is found through a Fokker-Planck style equation which is of the integro-differential type and contains non-local effects which are different for those postulated for a symmetric-stable process, or indeed the Gaussian process. Using the same Poisson transform interrelationsh...
A lacunarity analysis of the zero-crossings derived from Gaussian stochastic processes with oscillat...
Compound Poisson processes are the textbook example of pure jump stochastic processes and the buildi...
AbstractA representation for the probability generating functional (p.g.fl.) of a regular infinitely...
Continuous random processes are used to model a huge variety of real world phenomena. In particular,...
Discrete stability extends the classical notion of stability to random elements in discrete spaces b...
Lévy processes are the natural continuous-time analogue of random walks and form a rich class of sto...
A stochastic process or sometimes called random process is the counterpart to a deterministic proces...
Many stochastic problems arise in physics where we have to deal with a stochastic variable represent...
A general review of stochastic processes is given in the introduction; definitions, properties and a...
We introduce a general distributional framework that results in a unifying description and character...
The notion of stability can be generalised to point processes by defining the scaling operation in a...
The problem of zero crossings is of great historical prevalence and promises extensive application. ...
This thesis is composed of five chapters, regarding several models for dependence in stochastic proc...
We introduce a general distributional framework that results in a unifying description and character...
Abstract — We introduce a general distributional framework that results in a unifying description an...
A lacunarity analysis of the zero-crossings derived from Gaussian stochastic processes with oscillat...
Compound Poisson processes are the textbook example of pure jump stochastic processes and the buildi...
AbstractA representation for the probability generating functional (p.g.fl.) of a regular infinitely...
Continuous random processes are used to model a huge variety of real world phenomena. In particular,...
Discrete stability extends the classical notion of stability to random elements in discrete spaces b...
Lévy processes are the natural continuous-time analogue of random walks and form a rich class of sto...
A stochastic process or sometimes called random process is the counterpart to a deterministic proces...
Many stochastic problems arise in physics where we have to deal with a stochastic variable represent...
A general review of stochastic processes is given in the introduction; definitions, properties and a...
We introduce a general distributional framework that results in a unifying description and character...
The notion of stability can be generalised to point processes by defining the scaling operation in a...
The problem of zero crossings is of great historical prevalence and promises extensive application. ...
This thesis is composed of five chapters, regarding several models for dependence in stochastic proc...
We introduce a general distributional framework that results in a unifying description and character...
Abstract — We introduce a general distributional framework that results in a unifying description an...
A lacunarity analysis of the zero-crossings derived from Gaussian stochastic processes with oscillat...
Compound Poisson processes are the textbook example of pure jump stochastic processes and the buildi...
AbstractA representation for the probability generating functional (p.g.fl.) of a regular infinitely...