On the continuity of Pickands constants

Abstract

For a non-negative separable random field Z(t), t∈ Rd satisfying some mild assumptions we show that eqnarray* HZδ = T∞ 1Td E \ t∈ [0,T]d δ Zd Z(t) \ <∞ eqnarray* for δ 0 where 0 Zd := Rd and prove that HZ0 can be approximated by HZδ if δ tends to 0. These results extend the classical findings for the Pickands constants HZδ, defined for Z(t)= ( 2 Bα (t)- |t|2α ), t∈ R with Bα a standard fractional Brownian motion with Hurst parameter α ∈ (0,1]. The continuity of HZδ at δ=0 is additionally shown for two particular extensions of Pickands constants.