Measurable selections of multivalued mappings and projections of measurable sets

We investigate the convergence of measurable selectors for the limit of measurable multivalued maps. The relationship between the convergence of measurable selectors and lower and upper limits of measurable multivalued mappings with closed images is also derived.

## Abstract In an ordinary list multicoloring of a graph, the vertices are “colored” with subsets of pre‐assigned finite sets (called “lists”) in such a way that adjacent vertices are colored with disjoint sets. Here we consider the analog of such colorings in which the lists are measurable sets fr

We consider how to represent the measurable sets in an infinite measure space. We use sequences of simple measurable sets converging under metrics to represent general measurable sets. Then we study the computability of the measure and the set operators of measurable sets with respect to such repres

The density property of the set of extreme selections considered in general ORLIOZ spaces ia established in topologies finer than the weak one for measurable multifunctions taking values in locally convex S W S L ~ spaces and not necessarily integrable.