- [1]
- B. Blackadar.
K-Theory for Operator Algebras, volume 5 of Math. Sci.
Research Inst. Publ.
Springer-Verlag, New York, 1986.
- [2]
- C.F. Bödigheimer.
Splitting the Künneth sequence in K-theory.
Math. Ann., 242:159-171, 1979.
- [3]
- C.F. Bödigheimer.
Splitting the Künneth sequence in K-theory, II.
Math. Ann., 251:249-252, 1980.
- [4]
- L.G. Brown and G.K.
Pedersen.
C*-algebras of real rank zero.
J. Funct. Anal., 99:131-149, 1991.
- [5]
- J. Dixmier.
On some C*-algebras considered by Glimm.
J. Funct. Anal., 1:182-203, 1967.
- [6]
- 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.
- [7]
- M. Dadarlat and T.A. Loring.
Extensions of certain real rank zero C*-algebras.
Ann. Inst. Fourier, 44:907-925, 1994.
- [8]
- M. Dadarlat and T.A. Loring.
K-homology, asymptotic representations and unsuspended E-theory.
J. Funct. Anal., 126(2):367-383, 1994.
- [9]
- M. Dadarlat and T.A. Loring.
Classifying C*-algebras via ordered, mod-p K-theory.
Math. Ann., 305(4):601-616, 1996.
- [10]
- M. Dadarlat and T.A. Loring.
A universal multicoefficient theorem for the Kasparov groups.
Duke Math. J., 84(2):355-377, 1996.
- [11]
- M. Dadarlat.
Approximately unitarily equivalent morphisms and inductive limit
C*-algebras.
K-Theory, 9(2):117-137, 1995.
- [12]
- E.G. Effros and
C.-L. Shen.
Approximately finite C*-algebras and continued fractions.
Indiana J. Math., 29(2):191-204, 1980.
- [13]
- E.G. Effros.
Dimensions and C*-algebras.
Number 46 in CBMS Regional Conf. Ser. in Math., Providence, RI, 1981.
American Mathematical Society.
- [14]
- E.G. Effros.
On the structure of C*-algebras: Some old and new problems.
In R.V. Kadison, editor, Operator Algebras and Applications, pages
19-34, Kingston, 1980, 1981. Proc. Sympos. Pure Math., volume 38, part 1.
- [15]
- K. Egede Nielsen and K. Thomsen.
Limits of circle algebras.
Exposition. Math., 14(1):17-56, 1996.
- [16]
- S. Eilers.
A complete
invariant for AD algebras with real rank zero and bounded torsion in
K1.
J. Funct. Anal., 139:325-348, 1996.
- [17]
- S. Eilers.
Künneth
splittings and classification of C*-algebras with finitely many
ideals.
In Operator algebras and their applications (Waterloo, ON,
1994/1995), volume 13 of Fields Inst. Commun., pages
81-90. Amer. Math. Soc., Providence, RI, 1997.
- [18]
- G.A. Elliott and
D.E. Evans.
The structure of the irrational rotation C*-algebra.
Ann. of Math., 138:477-501, 1993.
- [19]
- G.A. Elliott,
G. Gong, X. Jiang, and H. Su.
A classification of simple limits of dimension drop C*-algebras.
In Operator algebras and their applications (Waterloo, ON,
1994/1995), volume 13 of Fields Inst. Commun., pages
125-143. Amer. Math. Soc., Providence, RI, 1997.
- [20]
- G.A. Elliott.
A classification of certain simple C*-algebras.
In Quantum and Non-Commutative Analysis, pages 373-385. Kluwer,
Dordrecht, 1993.
- [21]
- G.A. Elliott.
On the classification of C*-algebras of real rank zero.
J. reine angew. Math., 443:179-219, 1993.
- [22]
- G.A. Elliott.
A classification of certain simple C*-algebras II.
J. Ramanujan Math. Soc., 12(1):97-134, 1997.
- [23]
- L. Fuchs.
Infinite Abelian Groups I.
Academic Press, New York, San Francisco, London, 1970.
- [24]
- G. Gong.
On inductive limits of matrix algebras over higher dimensional spaces, part
II.
Math. Scand., 80(1):56-100, 1997.
- [25]
- G. Gong.
Classification of C*-algebras of real rank zero and unsuspended
E-equivalence types.
J. Funct. Anal., 152(2):281-329, 1998.
- [26]
- N. Jacobson.
Basic Algebra II.
W.H. Freeman and company, New York, 1980.
- [27]
- K.K. Jensen and
K. Thomsen.
Elements of KK-Theory.
Birkhäuser, Boston, 1991.
- [28]
- C.U. Jensen.
Les Foncteurs Dérivés de lim leftarrow et leurs Applications en
Théorie des Modules, volume 254 of Springer Lect. Notes in
Math.
Springer-Verlag, New York, 1972.
- [29]
- E. Kirchberg.
The classification of purely infinite C*-algebras using Kasparov's
theory.
Preprint, third draft, 1994.
- [30]
- S. Mac Lane.
Homology.
Springer-Verlag, Berlin, Göttingen, Heidelberg, 1963.
- [31]
- H. Lin and M. Rørdam.
Extensions of inductive limits of circle algebras.
J. London Math. Soc., 51(2):603-613, 1995.
- [32]
- T.A. Loring.
Stable relations II: Corona semiprojectivity and dimension-drop
C*-algebras.
Pacific J. Math., 172:461-475, 1996.
- [33]
- G.J. Murphy.
C*-Algebras and Operator Theory.
Academic Press, San Diego, 1990.
- [34]
- N.C. Phillips.
A classification theorem for nuclear purely infinite simple C*-algebras.
Preprint, 1994.
- [35]
- I.F. Putnam.
On the topological stable rank of certain transformation group
C*-algebras.
Ergod. Th. & Dynam. Sys., 10:197-207, 1990.
- [36]
- J.-E. Roos.
Sur les foncteurs dérivés de lim leftarrow . Applications.
C. R. Acad. Sci. Paris, 252:3702-3704, 1961.
- [37]
- J. Rosenberg
and C. Schochet.
The Künneth theorem and the universal coefficient theorem for Kasparov's
generalized K-functor.
Duke Math. J., 55:431-474, 1987.
- [38]
- C. Schochet.
Topological methods for C*-algebras II: Geometric resolutions and the
Künneth formula.
Pacific J. Math., 98:443-458, 1982.
- [39]
- C. Schochet.
Topological methods for C*-algebras IV: Mod p homology.
Pacific J. Math., 114:447-468, 1984.
- [40]
- C.L. Schochet.
On the fine structure of the Kasparov groups.
Preliminary draft, November 1994.
- [41]
- C.L. Schochet.
The UCT, the Milnor sequence, and a canonical decomposition of the
Kasparov groups.
K-Theory, 10(1):49-72, 1996.
- [42]
- K. Thomsen.
Limits of certain subhomogeneous C*-algebras.
Mém. Soc. Math. Fr. (N.S.), (71):vi+125 pp. (1998), 1997.
- [43]
- N.E. Wegge-Olsen.
K-Theory and C*-Algebras.
Oxford University Press, New York, 1993.
- [44]
- S. Zhang.
A Riesz decomposition property and ideal structure of multiplier algebras.
J. Operator Theory, 24:209-225, 1990.