@techreport{RR-07-05,
  abstract = "Given any &dagger;-symmetric monoidal category&nbsp;<strong>C</strong>&nbsp;we construct a new category&nbsp;<strong>Mix(C)</strong>, which, in the case that&nbsp;<strong>C</strong>&nbsp;is a &dagger;-compact category, is isomorphic to Selinger's&nbsp;<strong>CPM(C)</strong>&nbsp;[Sel]. Hence, if&nbsp;<strong>C</strong>&nbsp;is the category&nbsp;<strong>FdHilb</strong>&nbsp;of finite dimensional Hilbert spaces and linear maps we exactly obtain completely positive maps as morphisms. This means that&nbsp;<em>mixedness</em>&nbsp;of states and operations, within the categorical quantum axiomatics developed in [AC1, AC2, Sel, CPv, CPq], is a concept which exists independently of the quantum and classical structure. Moreover, since our construction does not require &dagger;-compactness, it can be applied to categories which have infinite dimensional Hilbert spaces as objects. Finally, in general&nbsp;<strong>Mix(C)</strong>&nbsp;is not a &dagger;-category, so does not admit a notion of positivity. This means that, in the abstract, the notion of 'complete positivity' can exist independently of a notion of 'positivity', which points at a very unfortunate terminology.",
  author = "Bob Coecke",
  institution = "Oxford University Computing Laboratory",
  month = "September",
  number = "RR-07-05",
  title = "Complete Positivity without Positivity and Without Compactness",
  year = "2007",
}