We study whether a multivariate Lévy-driven moving average process can shadow arbitrarily closely any continuous path, starting from the present value of the process, with positive conditional probability, which we call the conditional small ball property. Our main results establish the conditional small ball property for Lévy-driven moving average processes under natural non-degeneracy conditions on the kernel function of the process and on the driving Lévy process. We discuss in depth how to verify these conditions in practice. As concrete examples, to which our results apply, we consider fractional Lévy processes and multivariate Lévy-driven Ornstein–Uhlenbeck processes
We study a particular class of moving average processes that possess a property called localizabilit...
This thesis consists of four chapters, all relating to some sort of minorant or majorant of random w...
Markov processes have been widely studied and used for modeling problems. A Markov process has two m...
We study whether a multivariate Lévy-driven moving average process can shadow arbitrarily closely an...
The aim of the present paper is to study the semimartingale property of continuous time moving avera...
AbstractThese are processes A whose conditional laws, given some driving process X, are those of a p...
Let {X(t); 0[less-than-or-equals, slant]t[less-than-or-equals, slant]1} be a real-valued continuous ...
A multivariate analogue of the fractionally integrated continuous time autoregressive moving average...
We investigate the small deviations under various norms for stable processes defined by the convolut...
AbstractA multivariate analogue of the fractionally integrated continuous time autoregressive moving...
Abstract. This article provides an overview of recent work on descriptions and properties of the con...
The aim of the paper is to understand how the inclusion of more and more time scales into a stochast...
This thesis discusses the small deviation problem -- also called small ball or lower tail probabilit...
We show that the moving average process Χ_f(t) := ... has a bounded version almost surely, w...
AbstractThe moving average representations of discrete multidimensional stationary processes are gen...
We study a particular class of moving average processes that possess a property called localizabilit...
This thesis consists of four chapters, all relating to some sort of minorant or majorant of random w...
Markov processes have been widely studied and used for modeling problems. A Markov process has two m...
We study whether a multivariate Lévy-driven moving average process can shadow arbitrarily closely an...
The aim of the present paper is to study the semimartingale property of continuous time moving avera...
AbstractThese are processes A whose conditional laws, given some driving process X, are those of a p...
Let {X(t); 0[less-than-or-equals, slant]t[less-than-or-equals, slant]1} be a real-valued continuous ...
A multivariate analogue of the fractionally integrated continuous time autoregressive moving average...
We investigate the small deviations under various norms for stable processes defined by the convolut...
AbstractA multivariate analogue of the fractionally integrated continuous time autoregressive moving...
Abstract. This article provides an overview of recent work on descriptions and properties of the con...
The aim of the paper is to understand how the inclusion of more and more time scales into a stochast...
This thesis discusses the small deviation problem -- also called small ball or lower tail probabilit...
We show that the moving average process Χ_f(t) := ... has a bounded version almost surely, w...
AbstractThe moving average representations of discrete multidimensional stationary processes are gen...
We study a particular class of moving average processes that possess a property called localizabilit...
This thesis consists of four chapters, all relating to some sort of minorant or majorant of random w...
Markov processes have been widely studied and used for modeling problems. A Markov process has two m...