The smallest possible collection of continuous self-maps contains only the identity mapping and the constant functions. In Groups represented by homeomorphism groups I (Mathematische Annalen, Volume 138, pages 80–102, 1959), de Groot constructs a large class of topological spaces which have this smallest possible collection as their set of continuous self-maps.

The smallest possible collection of continuous self-maps contains only the identity mapping and the constant functions. In Groups represented by homeomorphism groups I (Mathematische Annalen, Volume 138, pages 80–102, 1959), de Groot constructs a large class of topological spaces which have this smallest possible collection as their set of continuous self-maps.