Abstract. Since the work of Mandelbrot in the 1960’s there has accumu-lated a great deal of empirical evidence for heavy tailed models in finance. In these models, the probability of a large fluctuation falls off like a power law. The generalized central limit theorem shows that these heavy-tailed fluctuations accumulate to a stable probability distribution. If the tails are not too heavy then the variance is finite and we find the familiar nor-mal limit, a special case of stable distributions. Otherwise the limit is a nonnormal stable distribution, whose bell-shaped density may be skewed, and whose probability tails fall off like a power law. The most important model parameter for such distributions is the tail thickness α, which gov-erns ...
In this paper, a calibrated scenario generation model for multivariate risk factors with heavy-taile...
This work aims at underlying the importance of a correct modelling of the heavy-tail behavior of ext...
The tail of the distribution of a sum of a random number of independent and identically distributed ...
Many of the concepts in theoretical and empirical finance developed over the past decades – includin...
The aim of this thesis is to show that the use of heavy-tailed distributions in finance is theoretic...
The paper characterizes first and second order tail behavior ofconvolutions of i.i.d. heavy tailed r...
This book focuses on general frameworks for modeling heavy-tailed distributions in economics, financ...
If a set of independent, identically distributed random vectors has heavy tails, so that the covaria...
One of the major points of contention in studying and modeling financial returns is whether or not t...
This thesis develops novel Bayesian methodologies for statistical modelling of heavy-tailed data. H...
This thesis focuses on the analysis of heavy-tailed distributions, which are widely applied to model...
The bottom line in many statistical analysis in finance is the basic issue of modeling a set of mult...
In recent research we can observe that statistical extreme value theory has been successfully used f...
Large deviations for fat tailed distributions, i.e. those that decay slower than exponential, are no...
For purposes of Value-at-Risk estimation, we consider several multivariate families of heavy-tail...
In this paper, a calibrated scenario generation model for multivariate risk factors with heavy-taile...
This work aims at underlying the importance of a correct modelling of the heavy-tail behavior of ext...
The tail of the distribution of a sum of a random number of independent and identically distributed ...
Many of the concepts in theoretical and empirical finance developed over the past decades – includin...
The aim of this thesis is to show that the use of heavy-tailed distributions in finance is theoretic...
The paper characterizes first and second order tail behavior ofconvolutions of i.i.d. heavy tailed r...
This book focuses on general frameworks for modeling heavy-tailed distributions in economics, financ...
If a set of independent, identically distributed random vectors has heavy tails, so that the covaria...
One of the major points of contention in studying and modeling financial returns is whether or not t...
This thesis develops novel Bayesian methodologies for statistical modelling of heavy-tailed data. H...
This thesis focuses on the analysis of heavy-tailed distributions, which are widely applied to model...
The bottom line in many statistical analysis in finance is the basic issue of modeling a set of mult...
In recent research we can observe that statistical extreme value theory has been successfully used f...
Large deviations for fat tailed distributions, i.e. those that decay slower than exponential, are no...
For purposes of Value-at-Risk estimation, we consider several multivariate families of heavy-tail...
In this paper, a calibrated scenario generation model for multivariate risk factors with heavy-taile...
This work aims at underlying the importance of a correct modelling of the heavy-tail behavior of ext...
The tail of the distribution of a sum of a random number of independent and identically distributed ...