Add to ORKGConsider a centered separable Gaussian process Y with a variance function that is regularly varying at infinity with index 2H[set membership, variant](0,2). Let [phi] be a 'drift' function that is strictly increasing, regularly varying at infinity with index [beta]>H, and vanishing at the origin. Motivated by queueing and risk models, we investigate the asymptotics for u-->[infinity] of the probability P(supt[greater-or-equal, slanted]0Yt-[phi](t)>u) as u-->[infinity]. To obtain the asymptotics, we tailor the celebrated double sum method to our general framework. Two different families of correlation structures are studied, leading to four qualitatively different types of asymptotic behavior. A generalized Pickands' constant appears in one ...
We establish sharp tail asymptotics for componentwise extreme values of bivariate Gaussian random ve...
Pickands constants play an important role in the exact asymptotic of extreme values for Gaussian sto...
Let {X-i(t), t >= 0}, 1 <= i <= n be mutually independent centered Gaussian processes with ...
Consider a centered separable Gaussian process $Y$ with a variance function that is regularly varyin...
Pickands constants play an important role in the exact asymptotic of extreme values for Gaussian sto...
AbstractPickands constants play an important role in the exact asymptotic of extreme values for Gaus...
We study the exact asymptotics of , as u-->[infinity], where and {Z(t):t>=0} is a centered stationar...
We consider a Gaussian stationary process with Pickands' conditions and evaluate an exact asymptotic...
For a given centered Gaussian process with stationary increments X(t),t ≥ 0 and c > 0, let Wγ(t) = X...
Abstract. This paper considers extreme values attained by a centered, multidimen-sional Gaussian pro...
htmlabstractThis paper considers extreme values attained by a centered, multidimensional Gaussian pr...
AbstractWe study the exact asymptotics of P(supt≥0IZ(t)>u), as u→∞, where IZ(t)={1t∫0tZ(s)dsfort>0Z(...
AbstractLet ξ(t) be a standard stationary Gaussian process with covariance function r(t), and η(t), ...
We establish sharp tail asymptotics for componentwise extreme values of bivariate Gaussian random ve...
Pickands constants play an important role in the exact asymptotic of extreme values for Gaussian sto...
Let {X-i(t), t >= 0}, 1 <= i <= n be mutually independent centered Gaussian processes with ...
Consider a centered separable Gaussian process $Y$ with a variance function that is regularly varyin...
Pickands constants play an important role in the exact asymptotic of extreme values for Gaussian sto...
AbstractPickands constants play an important role in the exact asymptotic of extreme values for Gaus...
We study the exact asymptotics of , as u-->[infinity], where and {Z(t):t>=0} is a centered stationar...
We consider a Gaussian stationary process with Pickands' conditions and evaluate an exact asymptotic...
For a given centered Gaussian process with stationary increments X(t),t ≥ 0 and c > 0, let Wγ(t) = X...
Abstract. This paper considers extreme values attained by a centered, multidimen-sional Gaussian pro...
htmlabstractThis paper considers extreme values attained by a centered, multidimensional Gaussian pr...
AbstractWe study the exact asymptotics of P(supt≥0IZ(t)>u), as u→∞, where IZ(t)={1t∫0tZ(s)dsfort>0Z(...
AbstractLet ξ(t) be a standard stationary Gaussian process with covariance function r(t), and η(t), ...
We establish sharp tail asymptotics for componentwise extreme values of bivariate Gaussian random ve...
Pickands constants play an important role in the exact asymptotic of extreme values for Gaussian sto...
Let {X-i(t), t >= 0}, 1 <= i <= n be mutually independent centered Gaussian processes with ...