Gromov Product Decomposition of 7-point Metric Spaces

Abstract

Let X be a finite metric space with elements Pi, i=1,…,n and with distance functions dij. The Gromov product of the triangle with vertices Pi, Pj and Pk at the vertex Pi is defined by ijk=12(dij+dik-djk). A metric space is called -generic, if the set of Gromov products at each Pi has a unique smallest element ijk. For a -generic metric space, the map Pi (PjPk), where (PjPk) is the edge joining Pj to Pk is a well defined map called the "Gromov product structure" [Bilge, Celik and Kocak, "An equivalence class decomposition of finite metric spaces", Discrete Mathmetics, Vol 340, (2017) 1928-1932]. For n=5, the 3 -equivalence classes coincide with the classification of 5-point metrics. For n=6, there are 26 -equivalence classes refined by 339 metric classes. In this paper, we present the first systematic treatment of 7-point spaces and we obtain the -equivalence decomposition of 7-point metric spaces that consist of 431 equivalence classes.