Vietoris-Rips Complexes of Split-Decomposable Spaces

Split-metric decompositions are an important tool in the theory of phylogenetics, particularly because of the link between the tight span and the class of totally decomposable spaces, a generalization of metric trees whose decomposition does not have a ``prime'' component. We use this connection to study the Vietoris-Rips complexes of totally decomposable spaces. In particular, we characterize the homotopy type of the Vietoris-Rips complex of circular decomposable spaces whose metric is monotone. We extend this result to compute the homology of certain non-monotone circular decomposable spaces. We also use the block decomposition of the tight span of a totally decomposable metric to induce a decomposition of the VR complex of a totally decomposable metric.