AbstractLet ξ(t) be a standard stationary Gaussian process with covariance function r(t), and η(t), another smooth random process. We consider the probabilities of exceedances of ξ(t)η(t) above a high level u occurring in an interval [0,T] with T>0. We present asymptotically exact results for the probability of such events under certain smoothness conditions of this process ξ(t)η(t), which is called the random variance process. We derive also a large deviation result for a general class of conditional Gaussian processes X(t) given a random element Y
AbstractWe consider the extreme values of fractional Brownian motions, self-similar Gaussian process...
We establish sharp tail asymptotics for componentwise extreme values of bivariate Gaussian random ve...
Let {Xi (t), t ≥ 0}, 1 ≤ i ≤ n be mutually independent centered Gaussian processes with almost surel...
AbstractLet ξ(t) be a standard stationary Gaussian process with covariance function r(t), and η(t), ...
This paper considers extreme values attained by a centered, multidimensional Gaussian process t) = (...
The main result of this contribution is the derivation of the exact asymptotic behavior of the supre...
We consider a Gaussian stationary process with Pickands' conditions and evaluate an exact asymptotic...
AbstractSuppose that X(t), t∈[0, T], is a centered differentiable Gaussian random process, X1(t), …,...
AbstractThis paper considers extreme values attained by a centered, multidimensional Gaussian proces...
Let {X(t),t a parts per thousand yen 0} be a centered Gaussian process and let gamma be a non-negati...
A well-known property of stationary Gaussian processes is that the excursions over high levels ("pea...
AbstractA well-known property of stationary Gaussian processes is that the excursions over high leve...
The problem of (pathwise) large deviations for conditionally continuous Gaussian processes is invest...
This contribution establishes exact tail asymptotics of sup((s,t)) is an element of E X(s,t) for a l...
Let {zeta((k))(m,k) (t), t >= 0}, k > 0 be random processes defined as the differences of two ...
AbstractWe consider the extreme values of fractional Brownian motions, self-similar Gaussian process...
We establish sharp tail asymptotics for componentwise extreme values of bivariate Gaussian random ve...
Let {Xi (t), t ≥ 0}, 1 ≤ i ≤ n be mutually independent centered Gaussian processes with almost surel...
AbstractLet ξ(t) be a standard stationary Gaussian process with covariance function r(t), and η(t), ...
This paper considers extreme values attained by a centered, multidimensional Gaussian process t) = (...
The main result of this contribution is the derivation of the exact asymptotic behavior of the supre...
We consider a Gaussian stationary process with Pickands' conditions and evaluate an exact asymptotic...
AbstractSuppose that X(t), t∈[0, T], is a centered differentiable Gaussian random process, X1(t), …,...
AbstractThis paper considers extreme values attained by a centered, multidimensional Gaussian proces...
Let {X(t),t a parts per thousand yen 0} be a centered Gaussian process and let gamma be a non-negati...
A well-known property of stationary Gaussian processes is that the excursions over high levels ("pea...
AbstractA well-known property of stationary Gaussian processes is that the excursions over high leve...
The problem of (pathwise) large deviations for conditionally continuous Gaussian processes is invest...
This contribution establishes exact tail asymptotics of sup((s,t)) is an element of E X(s,t) for a l...
Let {zeta((k))(m,k) (t), t >= 0}, k > 0 be random processes defined as the differences of two ...
AbstractWe consider the extreme values of fractional Brownian motions, self-similar Gaussian process...
We establish sharp tail asymptotics for componentwise extreme values of bivariate Gaussian random ve...
Let {Xi (t), t ≥ 0}, 1 ≤ i ≤ n be mutually independent centered Gaussian processes with almost surel...