(β)-distortion of some infinite graphs

Abstract

A distortion lower bound of ((h)1/p) is proven for embedding the complete countably branching hyperbolic tree of height h into a Banach space admitting an equivalent norm satisfying property (β) of Rolewicz with modulus of power type p∈(1,∞) (in short property (βp)). Also it is shown that a distortion lower bound of (1/p) is incurred when embedding the parasol graph with levels into a Banach space with an equivalent norm with property (βp). The tightness of the lower bound for trees is shown adjusting a construction of Matousek to the case of infinite trees. It is also explained how our work unifies and extends a series of results about the stability under nonlinear quotients of the asymptotic structure of infinite-dimensional Banach spaces. Finally two other applications regarding metric characterizations of asymptotic properties of Banach spaces, and the finite determinacy of bi-Lipschitz embeddability problems are discussed.