Magnitude homology of geodesic metric spaces with an upper curvature bound

Abstract

In this article, we study the magnitude homology of geodesic metric spaces of curvature ≤ , especially CAT() spaces. We will show that the magnitude homology MHln(X) of such a meric space X vanishes for small l and all n > 0. Conseqently, we can compute a total Z-degree magnitude homology for small l for the shperes Sn, the Euclid spaces En, the hyperbolic spaces Hn, and real projective spaces RPn with the standard metric. We also show that an existence of closed geodesic in a metric space guarantees the non-triviality of magnitude homology.