330 11. Simple C* -Algebrassuch that llwi-vill :Sf/ (where 8' will be determined later) and vjvi = 8i,jP,
for 1 .::; i, j .::; n - 1. Letting Q = L::?-l Vivi, one sees that
n-l n-l
11(1-Q)wn -wnll :SL llviwnl/ :S L(llvi -willllwnll + 8)
1 1
.::; (n - 1)(8'V'1+J + 8).The remainder of the proof is bookkeeping, nothing more; the point is
that (1 - Q)wn is almost a partial isometry with support p (since it's close
to wn), so we can perturb it to an honest partial isometry with support p
and range orthogonal to Q, by the (proof of the) n = 1 case. We leave the
details to the reader. DWe are now ready to excise certain u.c.p. maps. The excisable maps arise
as compressions in the GNS constructions of nice states. More precisely, let
cp E S(A) be a state which can be excised by projections and 7rcp: A-+ lIB(1-icp)
be the corresponding GNS representation. Let {Yi}~ 1 C A be such that
cp(yjyi) = 8i,j (i.e., in 1-icp, {Yi}~ 1 is an orthonormal set of vectors), let
PE JIB(1-icp) be the orthogonal projection onto the span of {Yi}~ 1 and define
a u.c.p. map <l?: A-+ PlIB(1-icp)P by <l?(a) = P7rcp(a)P.
Theorem 11.4.4 (Popa's local quantization). With notation as above, the
u.c.p. map <l? can be excised, meaning there exists a net of *-monomorphisms
Pi: PlIB(1-icp)P '---+A such thatllPi(P)api(P) - Pi(<l?(a))ll-+ 0,
for all a EA.Proof. Let ~ C A be a finite set of norm-one elements which contains the
unit of A, and let E > 0 be arbitrary. We must prove the existence of a
*-monomorphism p: PlIB(1-icp)P '---+A such that llp(P)ap(P) - p(<l?(a))ll < E,
for all a E ~.
Since cp can be excised by projections, we can, for any 8 > 0, find a
projection p E A such that llP(YjXYi)P - cp(yjxyi)Pll < 8 for all x E ~ and
1 :S i,j :S m. In particular, note that ll(YjP)*(YiP) - 8i,jPll < 8 for all
1.::; i,j _::; m.
In other words, {YiP }~ 1 is almost a set of partial isometries with orthog-
onal ranges and common support p. Thus, if 8 is sufficiently small, we can
perturb them to honest partial isometries {vi} such that vjvi = 8i,jP and
llvi - YiPll < E/6m^2 (8 depends on m and E; however we may also assume
that 8 < E /2m^2 ). Hence if we define fi,j = vivj, then {fi,j} is a set of matrix
units for an m x m-matrix algebra. Moreover, if we let q = I:: fi,i be the