Lévy Subordinators in Cones of Fuzzy Sets

The general problem of how to construct stochastic processes which are confined to stay in a predefined cone (in the one-dimensional but also multi-dimensional case also referred to as subordinators) is of course known to be of great importance in the theory and a myriad of applications. In this paper we see how this may be dealt with on the metric space of fuzzy sets/vectors: By first relating with each proper convex cone C in $$\mathbb {R}^{n}$$ R n a certain cone of fuzzy vectors $$C^*$$ C ∗ and subsequently using some very specific Banach space techniques we have been able to produce as many pairs $$(L^*_t, C^*)$$ ( L t ∗ , C ∗ ) of fuzzy Lévy processes $$L^*_t$$ L t ∗ and cones $$C^*$$ C ∗ of fuzzy vectors such that $$L^*_t$$ L t ∗ are $$C^*$$ C ∗ -subordinators.