Enveloppes convexes des processus gaussiens |
| |
| Authors: | Youri Davydov |
| |
| Affiliation: | Laboratoire de statistique et probabilités, bât. M2, FRE-CNRS 2222, Université des sciences et technologies de Lille, 59655, Villeneuve d'Ascq cedex, France |
| |
| Abstract: | Let X={X(t), t [0,1]} be a process on [0,1] and VX=Conv{(t,x) t[0,1], x=X(t)} be the convex hull of its path.The structure of the set ext(VX) of extreme points of VX is studied. For a Gaussian process X with stationary increments it is proved that: • The set ext(VX) is negligible if X is non-differentiable. • If X is absolutely continuous process and its derivative X′ is continuous but non-differentiable, then ext(VX) is also negligible and moreover it is a Cantor set. It is proved also that these properties are stable under the transformations of the type Y(t)=f(X(t)), if f is a sufficiently smooth function. |
| |
| Keywords: | Mots-clé : Processus gaussiens Enveloppes convexes Ensemble de CantorMots-clé : Gaussian processes Convex hulls Cantor sets |
| 本文献已被 ScienceDirect 等数据库收录! |
|
