A Duality Between Non-Archimedean Uniform Spaces and Subdirect Powers of Full Clones

Abstract

A uniform space is said to be non-Archimedean if it is generated by equivalence relations. If λ is a cardinal, then a non-Archimedean uniform space (X,U) is λ-totally bounded if each equivalence relation in U partitions X into less than λ blocks. If A is an infinite set, then let (A) be the algebra with universe A and where each a∈ A is a fundamental constant and every finitary function is a fundamental operation. We shall give a duality between complete non-Archimedean |A|+-totally bounded uniform spaces and subdirect powers of (A). We shall apply this duality to characterize the algebras dual to supercomplete non-Archimedean uniform spaces.