We derive theorems which outline explicit mechanisms by which anomalous scaling for the probability density function of the sum of many correlated random variables asymptotically prevails. The results characterize general anomalous scaling forms, explain their universal character, and specify universality domains in the spaces of joint probability density functions of the summand variables. These density functions are assumed to be invariant under arbitrary permutations of their arguments. Examples from the theory of critical phenomena are discussed. The novel notion of stability implied by the limit theorems also allows us to de. ne sequences of random variables whose sum satisfies anomalous scaling for any finite number of summands. If re...
We develop a scale-invariant truncated Lévy (STL) process to describe physical systems characterized...
In the last years fractal models have become the focus of many contributions dealing with market dyn...
This work is concerned with the analysis of self-similar stochastic pro-cesses, where statistical se...
We derive a central limit theorem for the probability distribution of the sum of many critically cor...
It has been recently found that a number of systems displaying crackling noise also show a remarkabl...
ABSTRACT. It has been recently found that a number of systems displaying crackling noise also show a...
This thesis is composed of five chapters, regarding several models for dependence in stochastic proc...
We consider undirected graphs that grow through the successive combination of component subgraphs. F...
It is shown that stretched exponential form of probability density of the random fractal systems is...
Our interest is in the scaled joint distribution associated with $k$-increasing subsequence...
Modeling the evolution of a financial index as a stochastic process is a problem awaiting a full, sa...
We determine the asymptotic distribution of the sum of correlated variables described by a matrix pr...
The thesis is made up of a number of studies involving long-range dependence (LRD), that is, a slow...
Consider a centered separable Gaussian process Y with a variance function that is regularly varying ...
Modelling the evolution of a financial index as a stochastic process is a problem awaiting a full, s...
We develop a scale-invariant truncated Lévy (STL) process to describe physical systems characterized...
In the last years fractal models have become the focus of many contributions dealing with market dyn...
This work is concerned with the analysis of self-similar stochastic pro-cesses, where statistical se...
We derive a central limit theorem for the probability distribution of the sum of many critically cor...
It has been recently found that a number of systems displaying crackling noise also show a remarkabl...
ABSTRACT. It has been recently found that a number of systems displaying crackling noise also show a...
This thesis is composed of five chapters, regarding several models for dependence in stochastic proc...
We consider undirected graphs that grow through the successive combination of component subgraphs. F...
It is shown that stretched exponential form of probability density of the random fractal systems is...
Our interest is in the scaled joint distribution associated with $k$-increasing subsequence...
Modeling the evolution of a financial index as a stochastic process is a problem awaiting a full, sa...
We determine the asymptotic distribution of the sum of correlated variables described by a matrix pr...
The thesis is made up of a number of studies involving long-range dependence (LRD), that is, a slow...
Consider a centered separable Gaussian process Y with a variance function that is regularly varying ...
Modelling the evolution of a financial index as a stochastic process is a problem awaiting a full, s...
We develop a scale-invariant truncated Lévy (STL) process to describe physical systems characterized...
In the last years fractal models have become the focus of many contributions dealing with market dyn...
This work is concerned with the analysis of self-similar stochastic pro-cesses, where statistical se...