Quantitative Algebras and a Classification of Metric Monads

Abstract

Quantitative algebras are -algebras acting on metric spaces, where operations are nonexpanding. Mardare, Panangaden and Plotkin introduced 1-basic varieties as categories of quantitative algebras presented by quantitative equations. We prove that for the category UMet of ultrametric spaces such varieties bijectively correspond to strongly finitary monads on UMet. The same holds for the category Met of metric spaces, provided that strongly finitary endofunctors are closed under composition. For uncountable cardinals λ there is an analogous bijection between varieties of λ-ary quantitative algebras and monads that are strongly λ-accessible. Moreover, we present a bijective correspondence between λ-basic varieties as introduced by Mardare et al and enriched, surjections-preserving λ-accesible monads on Met. Finally, for general enriched λ-accessible monads on Met a bijective correspondence to generalized varieties is presented.