Analysis on Laakso graphs with application to the structure of transportation cost spaces

Abstract

This article is a continuation of our article in [Canad. J. Math. Vol. 72 (3), (2020), pp. 774--804]. We construct orthogonal bases of the cycle and cut spaces of the Laakso graph Ln. They are used to analyze projections from the edge space onto the cycle space and to obtain reasonably sharp estimates of the projection constant of Lip0(Ln), the space of Lipschitz functions on Ln. We deduce that the Banach-Mazur distance from TC(Ln), the transportation cost space of Ln, to 1N of the same dimension is at least (3n-5)/8, which is the analogue of a result from [op. cit.] for the diamond graph Dn. We calculate the exact projection constants of Lip0(Dn,k), where Dn,k is the diamond graph of branching k. We also provide simple examples of finite metric spaces, transportation cost spaces on which contain ∞3 and ∞4 isometrically.