3.9. Exactness and tensor products 107The converse follows from the previous lemma since the top row of the
commutative diagramis an isometric isomorphism whenever A is @-exact. DIt follows that we may always assume separability.
The next result is quasi-obvious, there are just a bunch of identifications
to check. For the record, EBn An denotes the co-direct sum, i.e., the set of
sequences (an) such that limn llanll = 0.
Lemma 3.9.4. If E C A is a finite-dimensional operator system and En
are unital C* -algebras, then there is a u.c.p. isometric isomorphism
n n
defined on elementary tensors by
e Q9 (bn)n ~ ( e @ bn)n·
This map also gives an identification of E Q9 ( EBn En) and EBn (E Q9 En).Proof. Fix some concrete representations En C JE(Hn) and AC JE(JC). The
natural "diagonal" embeddingn n
induces an inclusionA Q9 (fJ En) C lBl (/( Q9 (EB Hn)).
n n
Similarly, we haveII A Q9 En C II JE(JC @ Hn) C lBl ( E9(JC @ Hn)).
n n n
The canonical isomorphism JC Q9 ( EBn Hn) ----+ EBn (JC@ Hn) gives an identifi-
cation