XII: 44, 567-690, LNM 649 (1978)
NANOPOULOS, Constantin;
NOBELIS, Photis
Régularité et propriétés limites des fonctions aléatoires (
Miscellanea,
Gaussian processes)
This paper extends to the non-Gaussian case methods to study the regularity of sample paths which have proved useful in the Gaussian case, notably that of majorizing measures (to be completed)
Comment: To be completed
Keywords: Sample path regularity,
Majorizing measuresNature: Original Retrieve article from Numdam
XV: 04, 38-43, LNM 850 (1981)
NOBELIS, Photis
Fonctions aléatoires lipschitziennes (
Regularity of random processes)
A sufficient condition is given so that almost all sample functions of a random process defined on $[0,1]^
N$ satisfy a Lipschitz condition (involving a general modulus of continuity). The method is that of majorizing measures. A condition due to Ibragimov is extended
Keywords: Majorizing measuresNature: Original Retrieve article from Numdam