spacesnonexpansive

Spacesnonexpansive is not a widely used term in mathematics. It most closely relates to the study of nonexpansive mappings in metric and normed spaces, where a map f: X → X is nonexpansive if d(f(x), f(y)) ≤ d(x, y) for all x, y in X. In a normed space this becomes ||f(x) − f(y)|| ≤ ||x − y||. If the map is linear, nonexpansiveness is equivalent to having operator norm ≤ 1.

The concept centers on how spaces support nonexpansive maps and the fixed-point phenomena that arise there.

Fixed-point theory provides key results for nonexpansive maps. While nonexpansive self-maps do not in general admit

Because spacesnonexpansive is not a standard term, this article treats it as a reference to the broader