The amalgamation property and Urysohn structures in continuous logic

Abstract

In this paper we consider the classes of all continuous L-(pre-)structures for a continuous first-order signature L. We characterize the moduli of continuity for which the classes of finite, countable, or all continuous L-(pre-)structures have the amalgamation property. We also characterize when Urysohn continuous L-(pre)-structures exist, establish that certain classes of finite continuous L-structures are countable Fra\"iss\'e classes, prove the coherent EPPA for these classes of finite continuous L-structures, and show that actions by automorphisms on finite L-structures also form a Fra\"iss\'e class. As consequences, we have that the automorphism group of the Urysohn continuous L-structure is a universal Polish group and that Hall's universal locally finite group is contained in the automorphism group of the Urysohn continuous L-structure as a dense subgroup.