Asymptotic behavior of random fields on the sequence of extending sets (Q1387265)

Let \(r(t)\) be a separable centered random field defined on a certain metric space \(T\). Let \(T_{z}\) be a system of extending subsets of \(T\) which depend on a non-negative parameter \(z\) and such that \(T_{z}\subset T\), \(T_{z}\uparrow T\) as \(z\to\infty\). The asymptotic behaviour as \(z\to\infty\) of the random variable \(\eta(z)=\sup_{t\in{T_{z}}}{{r(t)}/{\sqrt{Dr(t)}}}\) is investigated under the Cramér condition.