Probability and Mathematical Statistics: Vol. 23, Fasc. 1

VOLUMES

LINEARLY ADDITIVE RANDOM FIELDS WITH INDEPENDENT INCREMENTS ON TIME-LIKE CURVES

Shigeo Takenaka

Abstract: Let $V$ be a convex cone in $Rn.$ A curve $L = (l(t);t (- R ) < Rn +$ is called a time-like curve if $(l(s);s > t) < l(t)+ V$ holds for any $t.$ A random field $(X(t);t (- Rn)$ whose restriction $X | (t) = X(l(t)) L$ on time-like curve $L$ becomes an additive process is considered and it is characterized as a set-indexed random field on the dual cone $V *.$

2000 AMS Mathematics Subject Classification: Primary: -; Secondary: -;

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