- [1]
- C.A. Akemann and
S. Eilers.
Noncommutative end
theory.
Pacific J. Math., 185:47-88, 1998.
- [2]
- C.A. Akemann.
The general Stone-Weierstrass problem.
J. Funct. Anal., 4:277-294, 1969.
- [3]
- B. Blackadar.
Shape theory for C*-algebras.
Math. Scand., 56:249-275, 1985.
- [4]
- O. Bratteli, G.A.
Elliott, D.E. Evans, and A. Kishimoto.
Noncommutative spheres. II. Rational rotations.
J. Operator Theory, 27(1):53-85, 1992.
- [5]
- L.G. Brown.
Semicontinuity and multipliers of C*-algebras.
Canad. J. Math., XL(4):865-988, 1988.
- [6]
- E. Christensen
and S. Dorofeev.
On p-decimal C*-algebras.
Preprint, june 1995.
- [7]
- J. Dixmier.
Les C*-Algèbres et leurs Représentations.
Gauthiers-Villars, Paris, 1964.
- [8]
- M. Dadarlat and G. Gong.
A classification result for approximately homogeneous C*-algebras of real
rank zero.
Geom. Funct. Anal., 7(4):646-711, 1997.
- [9]
- E.G. Effros and
J. Kaminker.
Homotopy continuity and shape theory for C*-algebras.
In H. Araki and E.G. Effros, editors, Geometric Methods in Operator
Algebras, pages 152-180, Kyoto 1983, 1986. Pitman Res. Notes in Math.
Ser. 123.
- [10]
- S. Eilers, T.A. Loring,
and G.K. Pedersen.
Fragility of
subhomogeneous C*-algebras with one-dimensional spectrum, 1999.
- [11]
- S. Eilers, T.A. Loring,
and G.K. Pedersen.
Morphisms of
extensions of C^ *-algebras: pushing forward the Busby invariant.
Adv. Math., 147(1):74-109, 1999.
- [12]
- G.A. Elliott and
G. Gong.
On the classification of C*-algebras of real rank zero, II.
Ann. of Math., 144:497-610, 1996.
- [13]
- R. Exel and T.A.
Loring.
Invariants of almost commuting unitaries.
J. Funct. Anal., 95:364-376, 1991.
- [14]
- R. Exel.
The soft torus and applications to almost commuting matrices.
Pacific J. Math., 160:207-217, 1993.
- [15]
- P. Friis and
M. Rørdam.
Almost commuting self-adjoint matrices - a short proof of Huaxin Lin's
theorem.
J. reine angew. Math., 479:121-131, 1996.
- [16]
- G. Gong and H.Lin.
Classification of homomorphisms from C(X) into simple C*-algebras of
real rank zero.
Preprint, 1996.
- [17]
- G. Gong and H.Lin.
Almost multiplicative morphisms and almost commuting matrices.
J. Operator Theory, 40(2):217-275, 1998.
- [18]
- K.R. Goodearl.
Partially Ordered Abelian Groups with Interpolation.
American Mathematical Society, Providence, R.I., 1986.
- [19]
- T. Høegh-Krohn and T. Skjelbred.
Classification of C*-algebras admitting ergodic actions of the
two-dimensional torus.
J. reine angew. Math., 328:1-8, 1981.
- [20]
- X. Jiang and H. Su.
On a simple unital projectionless C*-algebra.
Amer. J. Math., 121(2):359-413, 1999.
- [21]
- H. Lin.
Almost commuting unitaries and classification of purely infinite simple
C*-algebras.
J. Funct. Anal., to appear.
- [22]
- H. Lin.
Almost commuting unitaries in purely infinite simple C*-algebras.
Math. Ann., 303:599-616, 1995.
- [23]
- H. Lin.
Almost commuting selfadjoint matrices and applications.
In Operator algebras and their applications (Waterloo, ON,
1994/1995), volume 13 of Fields Inst. Commun., pages
193-233. Amer. Math. Soc., Providence, RI, 1997.
- [24]
- H. Lin.
When almost multiplicative morphisms are close to homomorphisms.
Trans. Amer. Math. Soc., 351(12):5027-5049, 1999.
- [25]
- T.A. Loring and
G.K. Pedersen.
Corona extendibility and asymptotic multiplicativity.
K-Theory, 11(1):83-102, 1997.
- [26]
- T.A. Loring and
G.K. Pedersen.
Projectivity, transitivity and AF-telescopes.
Trans. Amer. Math. Soc., 350(11):4313-4339, 1998.
- [27]
- T.A. Loring.
K-theory and asymptotically commuting matrices.
Canad. J. Math., 40(1):197-216, 1988.
- [28]
- T.A. Loring.
The noncommutative topology of one-dimensional spaces.
Pacific J. Math., 136:145-158, 1989.
- [29]
- T.A. Loring.
The K-theory of AF embeddings of the rational rotation algebras.
K-theory, 4:227-243, 1991.
- [30]
- T.A. Loring.
C*-algebras generated by stable relations.
J. Funct. Anal., 112(1):159-203, 1993.
- [31]
- T.A. Loring.
Stable relations II: Corona semiprojectivity and dimension-drop
C*-algebras.
Pacific J. Math., 172:461-475, 1996.
- [32]
- T.A. Loring.
Lifting solutions to perturbing problems in C*-algebras,
volume 8 of Fields Institute Monographs.
American Mathematical Society, Providence, RI, 1997.
- [33]
- T.A. Loring.
When matrices commute.
Math. Scand., 82(2):305-319, 1998.
- [34]
- I.L. Markov.
The C*-algebra generated by a noncommutative circle (Russian).
Applications of the methods of functional analysis in mathematical physics,
1991.
- [35]
- G.K. Pedersen.
Measure theory for C*-algebras II.
Math. Scand., 22:63-74, 1968.
- [36]
- G.K. Pedersen.
A strict version of the non-commutative Urysohn lemma.
Proc. Amer. Math. Soc., 125(9):2657-2660, 1997.
- [37]
- M.A. Rieffel.
C*-algebras associated with irrational rotations.
Pacific J. Math., 93(2):415-429, 1981.
- [38]
- H. Su.
On the classification of C*-algebras of real rank zero: Inductive limits
of matrix algebras over non-Hausdorff graphs.
Mem. Amer. Math. Soc., 114(547), 1995.
- [39]
- K. Thomsen.
On the ordered K0 groups of a simple C*-algebra.
K-Theory, 14(1):79-99, 1998.
- [40]
- D. Voiculescu.
Asymptotically commuting finite rank unitary operators without commuting
approximants.
Acta Sci. Math. (Szeged), 45(1-4):429-431, 1983.