Krzysztof Dȩbicki scite author profile

Let {X(t) : t ∈ [0, ∞)} be a centered Gaussian process with stationary increments and variance function σ 2 X (t). We study the exact asymptotics of P(sup t∈[0,T ] X(t) > u) as u → ∞, where T is an independent of {X(t)} non-negative Weibullian random variable. As an illustration, we work out the asymptotics of the supremum distribution of fractional Laplace motion. This is an electronic reprint of the original article published by the ISI/BS in Bernoulli, 2011, Vol. 17, No. 1, 194-210. This reprint differs from the original in pagination and typographic detail.

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Extremal behavior of hitting a cone by correlated Brownian motion with drift

Dȩbicki

Hashorva

et al. 2018

Stochastic Processes and their Applications

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This paper derives an exact asymptotic expression forwhere X(t) = (X 1 (t), . . . , X d (t)) ⊤ , t ≥ 0 is a correlated d-dimensional Brownian motion starting at the pointThe derived asymptotics depends on the solution of an underlying multidimensional quadratic optimization problem with constraints, which leads in some cases to dimension-reduction of the considered problem. Complementary, we study asymptotic distribution of the conditional first passage time to U, which depends on the dimension-reduction phenomena.

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Krzysztof Dȩbicki

Ruin probability for Gaussian integrated processes

Queues and Lévy Fluctuation Theory

Asymptotics of supremum distribution of a Gaussian process over a Weibullian time

Extremal behavior of hitting a cone by correlated Brownian motion with drift

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