On cluster points of alternating projections

Abstract

Suppose that A and B are closed subsets of a Euclidean space such that A B≠, and we aim to find a point in this intersection with the help of the sequences (an) and (bn) generated by the method of alternating projections. It is well known that if A and B are convex, then (an) and (bn) converge to some point in A B. The situation in the nonconvex case is much more delicate. In 1990, Combettes and Trussell presented a dichotomy result that guarantees either convergence to a point in the intersection or a nondegenerate compact continuum as the set of cluster points. In this note, we construct two sets in the Euclidean plane illustrating the continuum case. The sets A and B can be chosen as countably infinite unions of closed convex sets. In contrast, we also show that such behaviour is impossible for finite unions.