- [1]
- O. Bratteli.
Inductive limits of finite dimensional C*-algebras.
Trans. Amer. Math. Soc., 171:195-234, 1972.
- [2]
- L.G. Brown and G.K.
Pedersen.
C*-algebras of real rank zero.
J. Funct. Anal., 99:131-149, 1991.
- [3]
- M. Dadarlat and S. Eilers.
Approximate
homogeneity is not a local property.
J. Reine Angew. Math., 507:1-13, 1999.
- [4]
- M. Dadarlat and T.A. Loring.
Extensions of certain real rank zero C*-algebras.
Ann. Inst. Fourier, 44:907-925, 1994.
- [5]
- S. Eilers and T.A.
Loring.
Computing
contingencies for stable relations.
Internat. J. Math., 10:301-326, 1999.
- [6]
- S. Eilers, T.A. Loring, and
G.K. Pedersen.
Stability of
anticommutation relations. An application of noncommutative CW
complexes.
J. reine angew. Math., 499:101-143, 1998.
- [7]
- 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.
- [8]
- 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.
- [9]
- H. Lin.
Exponential rank of C*-algebras with real rank zero and the
Brown-Pedersen conjectures.
J. Funct. Anal., 114(1):1-11, 1993.
- [10]
- H. Lin.
Approximation by normal elements with finite spectra in C*-algebras of
real rank zero.
Pacific J. Math., 173(2):443-489, 1996.
- [11]
- 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.
- [12]
- H. Lin.
When almost multiplicative morphisms are close to homomorphisms.
Trans. Amer. Math. Soc., 351(12):5027-5049, 1999.
- [13]
- T.A. Loring.
Lifting solutions to perturbing problems in C*-algebras,
volume 8 of Fields Institute Monographs.
American Mathematical Society, Providence, RI, 1997.
- [14]
- T.A. Loring.
Perturbation questions in the Cuntz picture of K-theory.
K-Theory, 11(2):161-193, 1997.
- [15]
- G.K. Pedersen.
Measure theory for C*-algebras II.
Math. Scand., 22:63-74, 1968.
- [16]
- N.C. Phillips.
Simple C*-algebras with the property weak FU.
Math. Scand., 69:127-151, 1991.
- [17]
- I. Raeburn and
A.M. Sinclair.
The C*-algebra generated by two projections.
Math. Scand., 65(2):278-290, 1989.
- [18]
- S. Zhang.
Diagonalizing projections in multiplier algebras and in matrices over a
C*-algebra.
Pacific J. Math., 145(1):181-200, 1990.