AbstractIn this paper, we establish some limit results on Csörgó-Révész-type increments combined with moduli of continuity for finite-dimensional Gaussian random fields under explicit conditions, via estimating upper bounds of large deviation probabilities on suprema of the finite-dimensional Gaussian random fields
We evaluate upper bounds for the maximal distributions of some Gaussian random fields, which arise i...
International audienceWe study the number of points where the gradient of a stationary Gaussian rand...
AbstractWe study the probability distribution F(u) of the maximum of smooth Gaussian fields defined ...
In this paper, we establish some limit theorems on the combined Csörgő-Révész increments with mo...
AbstractIn this paper, we establish some limit results on Csörgó-Révész-type increments combined wit...
AbstractIn this paper we establish simultaneously both large increment results and moduli of continu...
In this paper, we investigate several sample path properties on the increments of (N, d)-Gaussian ra...
This dissertation provides a detailed analysis of the behavior of suprema and moduli of continuity f...
This article addresses the problem of defining a general scaling setting in which Gaussian and non-G...
Abstract. We study the maximum of a Gaussian field on [0, 1]d (d ≥ 1) whose correlations decay loga-...
We prove that under fairly general conditions properly rescaled determinantal random point ...
We prove that under fairly general conditions properly rescaled determinantal random point ...
Az értekezés első részében autoregressziós típusú martingál mezőket tanulmányozok. Kiindulva Fazekas...
In [27] we introduced the notion of scaling transition for stationary random fields X on Z2 in terms...
AbstractWe study the probability distribution F(u) of the maximum of smooth Gaussian fields defined ...
We evaluate upper bounds for the maximal distributions of some Gaussian random fields, which arise i...
International audienceWe study the number of points where the gradient of a stationary Gaussian rand...
AbstractWe study the probability distribution F(u) of the maximum of smooth Gaussian fields defined ...
In this paper, we establish some limit theorems on the combined Csörgő-Révész increments with mo...
AbstractIn this paper, we establish some limit results on Csörgó-Révész-type increments combined wit...
AbstractIn this paper we establish simultaneously both large increment results and moduli of continu...
In this paper, we investigate several sample path properties on the increments of (N, d)-Gaussian ra...
This dissertation provides a detailed analysis of the behavior of suprema and moduli of continuity f...
This article addresses the problem of defining a general scaling setting in which Gaussian and non-G...
Abstract. We study the maximum of a Gaussian field on [0, 1]d (d ≥ 1) whose correlations decay loga-...
We prove that under fairly general conditions properly rescaled determinantal random point ...
We prove that under fairly general conditions properly rescaled determinantal random point ...
Az értekezés első részében autoregressziós típusú martingál mezőket tanulmányozok. Kiindulva Fazekas...
In [27] we introduced the notion of scaling transition for stationary random fields X on Z2 in terms...
AbstractWe study the probability distribution F(u) of the maximum of smooth Gaussian fields defined ...
We evaluate upper bounds for the maximal distributions of some Gaussian random fields, which arise i...
International audienceWe study the number of points where the gradient of a stationary Gaussian rand...
AbstractWe study the probability distribution F(u) of the maximum of smooth Gaussian fields defined ...
DOI
Add to ORKG