Periodic and fixed points of multivalued maps on Euclidean spaces

Abstract

We show, in particular, that a multivalued map f from a closed subspace X of Rn to expk( Rn) has a point of period exactly M if and only if its continuous extension f: β X expk(β Rn) has such a point. The result also holds if one repace Rn by a locally compact Lindel\"of space of finite dimension. We also show that if f is a colorable map froma normal space X to the space K(X) of all compact subsets of X then its extension f:β X K(β X) is fixed-point free.