112 3. Tensor ProductsExercise 3.9"6. Prove that A is exact if and only if the sequenceO, ( ~Mn(C)) Q9A, (I]Mn(C)) Q9A, (~:::~~~) Q9A,O
is exact.
Exercise 3.9" 7. Prove that A is exact if and only if the sequenceO __, JK(H) Q9 A __, Illl(H) Q9 A __, ~~~~ Q9 A __, Ois exact for some infinite-dimensional Hilbert space H.
Exercise 3.9.8. Assume 0 __, J __,A__, A/ J __, 0 is a locally split (Defini-
tion 3. 7.5) short exact sequence. Prove that if J and A/ J are exact, then
so is A.^29 (Hint: Revisit Proposition 3.7.6 and then do a big diagram chase
(aka the 3 x 3 Lemma) through
0 0 01 1 1
0---+ JQ9J ---+ BQ9 J ---+ B/IQ9 J ---+ 01 1 1
0---+ IQ9A ---+ B Q9A ---+ B/IQ9A ---+ 01 1 1
O ---+ I Q9 A/ J ---+ BQ9A/J ---+ B/I Q9 A/J ---+ 01 1 1
0 0 0
Exercise 3.9.9. If one assumes a nontrivial tensor product fact, a very
short proof of Kirchberg's Theorem can be given. Assume that there is
a unique C-norm on C(JF 00 ) 8 Illl(H) (this is a fact - see Section 13.2).
Deduce Theorem 3.9.1. (Hint: If A C Illl(H) is Q9-exact, then try to prove
that A Q9max B __, Illl(H) Q9max B factors through the spatial tensor product,
for every B.)
3.10. ·References
Takesaki's Theorem was proved in [182]; the result is quite surprising, as the
injective Banach space norm need not be the smallest, in general. Continuity
of c.p. maps on maximal tensor products relies on [9], where Arveson intro-
duced c.c. maps and proved his fundamental extension theorem. The Trick is
(^29) Kirchberg has constructed counterexamples when the sequence is not locally split (see
Remark 13.4.2). ·