Tensor products for non-unital operator systems

In this short article, we study tensor products of not necessarily unital operator systems (for short, NUOS). We will define canonical functorial NUOS tensor products (in a similar fashion to Kavruk et al. (2011) [4]) as well as a subclass of them consisting of reduced functorial NUOS tensor products (that are defined through a unitalization process). We show that if a NUOS X is ( Min , Max ) -nuclear (in the sense that there is only one NUOS tensor product of X with any NUOS Y ), then X is trivial. However, if V is a unital operator system, then V is ( min 0 , max 0 ) -nuclear (in the sense that there is only one reduced NUOS tensor product of V with any NUOS Y ) if and only if V is ( min , max ) -nuclear in the sense of Han and Paulsen (2011) [2] (i.e. there is only one unital operator system tensor product of V with any unital operator system W ). On the other hand, a C ∗ -algebra A is ( min 0 , max 0 ) -nuclear if and only if A is a nuclear C ∗ -algebra.