Monadic forgetful functors and (non-)presentability for C*- and W*-algebras

Abstract

We prove that the forgetful functors from the categories of C*- and W*-algebras to Banach *-algebras, Banach algebras or Banach spaces are all monadic, answering a question of J.Rosick\'y, and that the categories of unital (commutative) C*-algebras are not locally-isometry 0-generated either as plain or as metric-enriched categories, answering a question of I. Di Liberti and Rosick\'y. We also prove a number of negative presentability results for the category of von Neumann algebras: not only is that category not locally presentable, but in fact its only presentable objects are the two algebras of dimension 1. For the same reason, for a locally compact abelian group G the category of G-graded von Neumann algebras is not locally presentable.