Amalgamation and Ramsey properties of Lp spaces

Abstract

We study the dynamics of the group of isometries of Lp-spaces. In particular, we study the canonical actions of these groups on the space of δ-isometric embeddings of finite dimensional subspaces of Lp(0,1) into itself, and we show that for p ≠ 4,6,8,… they are -transitive provided that δ is small enough. We achieve this by extending the classical equimeasurability principle of Plotkin and Rudin. We define the central notion of a Fra\"iss\'e Banach space which underlies these results and of which the known separable examples are the spaces Lp(0,1), p ≠ 4,6,8,… and the Gurarij space. We also give a proof of the Ramsey property of the classes \pn\n, p≠ 2,∞, viewing it as a multidimensional Borsuk-Ulam statement. We relate this to an arithmetic version of the Dual Ramsey Theorem of Graham and Rothschild as well as to the notion of a spreading vector of Matousek and R\"odl. Finally, we give a version of the Kechris-Pestov-Todorcevic correspondence that links the dynamics of the group of isometries of an approximately ultrahomogeneous space X with a Ramsey property of the collection of finite dimensional subspaces of X.