On the Initial Algebra and Final Co-algebra of some Endofunctors on Categories of Pointed Metric Spaces

Abstract: We consider two endofunctors of the form F : X −→ M ⊗X , where M is a non degenerate module, related to the unit interval and the Sierpinski gasket, and their final co-algebras. The functors are defined on the categories of bipointed and tri-pointed metric spaces, with continuous maps, short maps or Lipschitz maps as the choice of morphisms.First we demonstrate that the final co-algebra for these endofunctors on the respective category of pointed metric spaces with the choice of continuous maps is the final co… Show more