Add to ORKGIn this paper, we investigate several sample path properties on the increments of (N, d)-Gaussian random fields and also we obtain the law of iterated logarithm for the Gaussian random field, via estimating upper and lower bounds of large deviation probabilities on suprema of the (N, d)-Gaussian random fields
24 pages, 2 figuresInternational audienceWe survey the properties of the log-correlated Gaussian fie...
We evaluate upper bounds for the maximal distributions of some Gaussian random fields, which arise i...
Sample path intersection has been of interest to physicists for many years, due to its connections t...
AbstractIn this paper, we establish some limit results on Csörgó-Révész-type increments combined wit...
Anisotropic Gaussian random fields arise in probability theory and in various applications. Typical ...
In this paper we establish Chung's law of the iterated logarithm for a class of anisotropic Gaussian...
In this paper, we establish some limit theorems on the combined Csörgő-Révész increments with mo...
AbstractIn this paper we establish simultaneously both large increment results and moduli of continu...
A timely and comprehensive treatment of random field theory with applications across diverse areas o...
We consider the Gaussian free field (GFF) on and obtain the law of the iterated logarithm for it, wh...
AbstractIn this paper, we establish some limit results on Csörgó-Révész-type increments combined wit...
24 pages, 2 figuresWe survey the properties of the log-correlated Gaussian field (LGF), which is a c...
24 pages, 2 figuresWe survey the properties of the log-correlated Gaussian field (LGF), which is a c...
AbstractFor a d-dimensional random field X(t) define the occupation measure corresponding to the lev...
24 pages, 2 figuresWe survey the properties of the log-correlated Gaussian field (LGF), which is a c...
24 pages, 2 figuresInternational audienceWe survey the properties of the log-correlated Gaussian fie...
We evaluate upper bounds for the maximal distributions of some Gaussian random fields, which arise i...
Sample path intersection has been of interest to physicists for many years, due to its connections t...
AbstractIn this paper, we establish some limit results on Csörgó-Révész-type increments combined wit...
Anisotropic Gaussian random fields arise in probability theory and in various applications. Typical ...
In this paper we establish Chung's law of the iterated logarithm for a class of anisotropic Gaussian...
In this paper, we establish some limit theorems on the combined Csörgő-Révész increments with mo...
AbstractIn this paper we establish simultaneously both large increment results and moduli of continu...
A timely and comprehensive treatment of random field theory with applications across diverse areas o...
We consider the Gaussian free field (GFF) on and obtain the law of the iterated logarithm for it, wh...
AbstractIn this paper, we establish some limit results on Csörgó-Révész-type increments combined wit...
24 pages, 2 figuresWe survey the properties of the log-correlated Gaussian field (LGF), which is a c...
24 pages, 2 figuresWe survey the properties of the log-correlated Gaussian field (LGF), which is a c...
AbstractFor a d-dimensional random field X(t) define the occupation measure corresponding to the lev...
24 pages, 2 figuresWe survey the properties of the log-correlated Gaussian field (LGF), which is a c...
24 pages, 2 figuresInternational audienceWe survey the properties of the log-correlated Gaussian fie...
We evaluate upper bounds for the maximal distributions of some Gaussian random fields, which arise i...
Sample path intersection has been of interest to physicists for many years, due to its connections t...