326 11. Simple C*-AlgebrasTo finish the proof one considers the representation
1T = 1T1 EB ... EB ?Tj: A-----+ JB(H1 EB ... EB Hj)
and the projection PE JB(H1 EB··· EB Hj) obtained by adding up P1, ... , Pk
(using the identifications JB(Hi) ~ JB(Hm) for some m :::::; j whenever i > j).
Since 7T 1 , ... , ?Tj are pairwise disjoint, P E ?T(A)". Finally, P commutes
with ?T(A\O), compression by P recaptures 'PIA'P, and this easily implies that
P almost commutes with ~ and approximately preserves the norms after
compression. DHere is the main technical result. It depends on Smith's lemma (Lemma
B.4), which you may want to review before reading the proof.
Proposition 11.3.8. The unital C* -algebra A is inner QD if and only if
it satisfies the following approximate factorization property: For every finite
set ~ C A, c: > 0 and every u.c.p. map <p: A -----+ Mk(<C), there exist a
projection p in the socle of A** and a u.c.p. map 'ljJ: pA**p-----+ Mk(<C) such
that
(1) ll[a,pJll < c: and
(2) 117/J(pap) - <p(a)ll < E for all a E ~-Proof. The "if' direction is trivial since one can always find u.c.p. maps
'Pn: A-----+ Mk(n)(<C) such that llall = lim ll'Pn(a)ll for all a EA (just cut by
finite-rank projections in some faithful representation).
To prove the "only if" direction, let's take Pn as in Definition 11.3.1 and
denote by (}n: A -----+ PnApn the corresponding compressions. Since the (}n's
are asymptotically multiplicative and asymptotically isometric, one has
n~~ ll(idMk(IC) 0 (}n)(x)ll = llxllMk(IC)®A
for any fixed k EN and x E Mk(<C) @A. (Why?) Now suppose that a finite-
dimensional operator system EC A, E > 0 and a u.c.p. map <p: A-----+ Mk(<C)
are given. Note that (}nlE is a linear isomorphism for sufficiently large n,
hence we can let e;;-^1 : (}n(E) -----+ E denote the inverse. It follows from the
above equality and Lemma B.4 that
limsup ll'P o 8~^1 llcb = limsup llidMk(IC) 0 (<po 8~^1 )11
n n
:S limsup ll(idMk(IC) 0 (}nlE)-^111
n
:::::; 1.
Hence, we can find n such that ll'P o e;;-^1 llcb < 1 + c/2. We may assume
that p = Pn satisfies condition (1). Since <po 8;;-^1 is unital and self-adjoint,
it can be perturbed to a u.c.p. map 'ljJ by Corollary B.9. Extending 'ljJ to all
of pA**p, by Arveson's Extension Theorem, we are done. D