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\begin{document}
\section{Topical References for Operator Algebras in Theoretical Physics and Algebraic Quantum Field Theories (AQFT):}
\begin{thebibliography} {299}
\bibitem{AW}
Akutsu, Y. and Wadati, M. (1987).
Knot invariants and critical statistical systems.
{\em Journal of the Physics Society of Japan},
{\bf 56}, 839--842.
\bibitem{Al}
Alexander, J. W. (1930).
The combinatorial theory of complexes.
{\em Annals of Mathematics}, {\bf (2) 31}, 294--322.
\bibitem{ABF}
Andrews, G. E., Baxter, R. J. and Forrester, P.J. (1984).
Eight vertex SOS model and generalized
Rogers--Ramanujan type identities. {\em Journal of Statistical Physics}, {\bf 35}, 193--266.
\bibitem{AoY}
Aoi, H. and Yamanouchi, T. (in press).
Construction of a canonical subfactor for an inclusion of factors with a common Cartan subalgebra.
{\rm Hokkaido Mathematical Journal}.
\bibitem{AGO}
Arcuri, R. C., Gomes, J. F. and D. I. Olive (1987). Conformal subalgebras and symmetric spaces.
{\em Nuclear Physics B}, {\bf 285}, 327--339.
\bibitem{Art}
Artin, E. (1947). Theory of braids. {\em Annals of Mathematics},
{\bf 48} 101--126.
\bibitem{A2}
Asaeda, M. (2007). Galois groups and an obstruction to principal graphs of subfactors.
{\em International Journal of Mathematics}, {\bf 18}, 191--202.
math.OA/0605318.
\bibitem{AH}
Asaeda, M. and Haagerup, U. (1999). Exotic subfactors of finite depth with Jones indices
${(5+\sqrt{13})}/{2}$ and ${(5+\sqrt{17})}/{2}$. {\em Communications in Mathematical Physics},
{\bf 202}, 1--63.
\bibitem{AY}
Asaeda, M. and Yasuda, S. (preprint 2007). On Haagerup's list of potential principal graphs of subfactors.
arXiv:0711.4144.
\bibitem{At1}
Atiyah, M. (1967). $K$-theory. {\em W. A. Benjamin Inc., New York}.
\bibitem{At2}
Atiyah, M. (1989). Topological quantum field theory. {\em Publication Math\'ematiques IHES},
{\bf 68}, 175--186.
\bibitem{Au}
Aubert, P.-L. (1976). Th\'eorie de Galois pour une $W^*$-alg\`ebre. {\em Commentarii Mathematici Helvetici},
{\bf 39 (51)}, 411--433.
\bibitem{BSZ}
Baez, J. C., Segal, I. E. and Zhou, Z. (1992). Introduction to algebraic and constructive quantum
field theory. {\em Princeton University Press}.
\bibitem{BK}
Bakalov, B. and Kirillov, A. Jr. (2001). Lectures on tensor categories and modular functors.
University Lecture Series {\bf 21}, Amer. Math. Soc.
\bibitem{Ban1}
Banica, T. (1997). Le groupe quantique compact libre $U(n)$, {\em Communications in Mathematical Physics}, {\bf 190},
143--172.
\bibitem{Ban2}
Banica, T. (1998). Hopf algebras and subfactors associated to vertex models.
{\em Journal of Functional Analysis}, {\bf 159}, 243--266.
\bibitem{Ban3}
Banica, T. (1999). Representations of compact quantum groups and subfactors.
{\em Journal f\"ur die Reine und Angewandte Mathematik}, {\bf 509}, 167--198.
\bibitem{Ban4}
Banica, T. (1999). Fusion rules for representations of compact quantum groups.
{\em Expositiones Mathematicae}, {\bf 17}, 313--337.
\bibitem{Ban5}
Banica, T. (1999). Symmetries of a generic coaction. {\em Mathematische Annalen}, {\bf 314}, 763--780.
\bibitem{Ban6}
Banica, T. (2000). Compact Kac algebras and commuting squares.
{\em Journal of Functional Analysis}, {\bf 176}, 80--99.
\bibitem{Ban7}
Banica, T. (2001). Subfactors associated to compact Kac algebras.
{\em Integral Equations Operator Theory}, {\bf 39}, 1--14.
\bibitem{Ban8}
Banica, T. (2002). Quantum groups and Fuss-Catalan algebras.
{\em Communications in Mathematical Physics}, {\bf 226}, 221--232
\bibitem{Ban9}
Banica, T. (2005). The planar algebra of a coaction. {\em Journal of Operator Theory} {\bf 53}, 119--158.
\bibitem{Ban10}
Banica, T. (2005). Quantum automorphism groups of homogeneous graphs.
{\em Journal of Functional Analysis}, {\bf 224}, 243--280.
\bibitem{Ban11}
Banica, T. (2005). Quantum automorphism groups of small metric spaces.
{\em Pacific Journal of Mathematics}, {\bf 219}, 27--51.
\bibitem{Ba1}
Baxter, R. J. (1981).Rogers--Ramanujan identities in the Hard Hexagon model. {\em Journal of Statistical Physics}, {\bf 26},
427--452.
\bibitem{Ba2}
Baxter, R. J. (1982). {\em Exactly solved models in statistical mechanics}.
Academic Press, New York.
\bibitem{Ba4}
Baxter, R. J. (1988). The superintegrable chiral Potts model. {\em Physics Letters A}, {\bf 133}, 185--189.
\bibitem{Ba3}
Baxter, R. J. (1989). A simple solvable $Z_4(N)$ Hamiltonian.
{\em Physics Letters A}, {\bf 140}, 155--157.
\bibitem{Ba5}
Baxter, R. J. (1989). Superintegrable Chiral Potts model: thermodynamic
properties, an ``inverse'' model, and a simple associated Hamiltonian. {\em Journal of Statistical
Physics}, {\bf 57}, 1--39.
\bibitem{BKW}
Baxter, R. J., Kelland, S. B. and Wu, F. Y. (1976). Potts model or Whitney Polynomial.
{\em Journal of Physics. A. Mathematical and General},
{\bf 9}, 397--406.
\bibitem{BPA}
Baxter, R. J., Perk, J. H. H. and Au-Yang, H. (1988). New solutions of the star-triangle relations for the chiral Potts model. {\em Physics Letters A} {\bf 128}, 138--142.
\bibitem{BTA}
Baxter, R. J., Temperley, H. N. V. and Ashley, S. E. (1978).
Triangular Potts model and its transition temperature and related models.
{\em Proceedings of the Royal Society of London A},
{\bf 358}, 535--559.
\bibitem{BeE}
Behrend, R. E., Evans, D. E. (preprint 2003). Integrable Lattice Models for Conjugate $A^{(1)}_n$.
hep-th/0309068.
\bibitem{BPPZ}
Behrend, R. E., Pearce, P. A., Petkova, V. B. and Zuber, J-B. (2000).
Boundary conditions in rational conformal field theories.
{\em Nuclear Physics B}, {\bf 579}, 707--773.
\bibitem{BPZ}
Belavin, A. A., Polyakov, A. M. and Zamolodchikov, A. B. (1980).
Infinite conformal symmetry in two-dimensional quantum field theory.
{\em Nuclear Physics B}, {\bf 241}, 333--380.
\bibitem{Ber}
Berezin, F. A. (1966). A method of second quantization. {\em Academic Press}, London/New York.
\bibitem{BCL}
Bertozzini, P., Conti, R. and Longo, R. (1998) Covariant sectors with infinite dimension and positivity of the energy.
{\em Communications in Mathematical Physics}, {\bf 193}, 471--492.
\bibitem{BiN}
Bion-Nadal, J. (1992).
Subfactor of the hyperfinite $II_1$ factor with
Coxeter graph $E_6$ as invariant.
{\em Journal of Operator Theory}, {\bf 28}, 27--50.
\bibitem{Bi}
Birman, J. (1974). Braids, links and mapping class groups.
{\em Annals of Mathematical Studies}, {\bf 82}.
\bibitem{BW}
Birman, J. S. and Wenzl, H. (1989).
Braids, link polynomials and a new algebra.
{\em Transactions of the American Mathematical Society},
{\bf 313}, 249--273.
\bibitem{Bs1}
Bisch, D. (1990). On the existence of central sequences in subfactors.
{\em Transactions of the American Mathematical Society},
{\bf 321}, 117--128.
\bibitem{Bs2}
Bisch, D. (1992). Entropy of groups and subfactors.
{\em Journal of Functional Analysis}, {\bf 103},
190--208.
\bibitem{Bs3}
Bisch, D. (1994). A note on intermediate subfactors.
{\em Pacific Journal of Mathematics}, {\bf 163},
201--216.
\bibitem{Bs4}
Bisch, D. (1994).
On the structure of finite depth subfactors.
in {\em Algebraic methods in operator theory},
(ed. R. Curto and P. E. T. J\"orgensen),
Birkh\"auser, 175--194.
\bibitem{Bs5}
Bisch, D. (1994).
Central sequences in subfactors II.
{\em Proceedings of the American Mathematical Society},
{\bf 121}, 725--731.
\bibitem{Bs6}
Bisch, D. (1994).
An example of an irreducible subfactor of the hyperfinite
II$_1$ factor with rational, non-integer index.
{\em Journal f\"ur die Reine und Angewandte
Mathematik}, {\bf 455}, 21--34.
\bibitem{Bs7}
Bisch, D. (1997).
Bimodules, higher relative commutants and the fusion algebra
associated to a subfactor.
In {\em Operator algebras and their applications}.
Fields Institute Communications,
Vol. 13, American Math. Soc., 13--63.
\bibitem{Bs8}
Bisch, D. (1998).
Principal graphs of subfactors with small Jones index.
{\em Mathematische Annalen}, {\bf 311}, 223--231.
\bibitem{Bs9}
Bisch, D. (2002).
Subfactors and planar algebras.
{\em Proc. ICM-2002, Beijing}, {\bf 2}, 775--786.
\bibitem{BH}
Bisch, D. and Haagerup, U. (1996).
Composition of subfactors: New examples of infinite
depth subfactors.
{\em Annales Scientifiques de l'\'Ecole Normale
Superieur}, {\bf 29}, 329--383.
\bibitem{BJ}
Bisch, D. and Jones, V. F. R. (1997).
Algebras associated to intermediate subfactors.
{\em Inventiones Mathematicae},
{\bf 128}, 89--157.
\bibitem{BJ2}
Bisch, D. and Jones, V. F. R. (1997).
A note on free composition of subfactors.
In {\em Geometry and Physics, (Aarhus 1995)},
Marcel Dekker, Lecture Notes in Pure
and Applied Mathematics, Vol. 184, 339--361.
\bibitem{BJ3}
Bisch, D. and Jones, V. F. R. (2000).
Singly generated planar algebras of small dimension.
{\em Duke Mathematical Journal}, {\bf 101}, 41--75.
\bibitem{BJ4}
Bisch, D. and Jones, V. F. R. (2003).
Singly generated planar algebras of small dimension. II
{\em Advances in Mathematics}, {\bf 175}, 297--318.
\bibitem{BNP}
Bisch, D., Nicoara, R. and Popa, S. (2007).
Continuous families of hyperfinite subfactors with
the same standard invariant.
{\em International Journal of Mathematics}, {\bf 18}, 255--267.
math.OA/0604460.
\bibitem{BP}
Bisch, D. and Popa, S. (1999).
Examples of subfactors with property T standard invariant.
{\em Geometric and Functional Analysis}, {\bf 9}, 215--225.
\bibitem{Bk}
B\"ockenhauer, J. (1996).
An algebraic formulation of level one Wess-Zumino-Witten models.
{\em Reviews in Mathematical Physics}, {\bf 8}, 925--947.
\bibitem{BE}
B\"ockenhauer, J. and Evans, D. E. (1998).
Modular invariants, graphs and $\alpha$-induction for
nets of subfactors I.
{\em Communications in Mathematical Physics}, {\bf 197}, 361--386.
\bibitem{BE2}
B\"ockenhauer, J. and Evans, D. E. (1999).
Modular invariants, graphs and $\alpha$-induction for
nets of subfactors II.
{\em Communications in Mathematical Physics}, {\bf 200}, 57--103.
\bibitem{BE3}
B\"ockenhauer, J. and Evans, D. E. (1999).
Modular invariants, graphs and $\alpha$-induction for
nets of subfactors III.
{\em Communications in Mathematical Physics}, {\bf 205}, 183--228.
\bibitem{BE4}
B\"ockenhauer, J. and Evans, D. E. (2000).
Modular invariants from subfactors: Type I coupling matrices and
intermediate subfactors.
{\em Communications in Mathematical Physics}, {\bf 213}, 267--289.
\bibitem{BE5}
B\"ockenhauer, J. and Evans, D. E. (2002).
Modular invariants from subfactors.
in {\em Quantum Symmetries in Theoretical Physics and Mathematics}
(ed. R. Coquereaux et al.),
Comtemp. Math. {\bf 294}, Amer. Math. Soc., 95--131.
math.OA/0006114.
\bibitem{BE6}
B\"ockenhauer, J. and Evans, D. E. (2001).
Modular invariants and subfactors.
in {\em Mathematical Physics in Mathematics and Physics} (ed. R. Longo),
The Fields Institute Communications {\bf 30}, Providence, Rhode Island:
AMS Publications, 11--37.
math.OA/0008056.
\bibitem{BEK}
B\"ockenhauer, J., Evans, D. E. and Kawahigashi, Y. (1999).
On $\alpha$-induction, chiral generators
and modular invariants for subfactors.
{\em Communications in Mathematical Physics}, {\bf 208}, 429--487.
math.OA/9904109.
\bibitem{BEK2}
B\"ockenhauer, J., Evans, D. E. and Kawahigashi, Y. (2000).
Chiral structure of modular invariants for subfactors.
{\em Communications in Mathematical Physics}, {\bf 210}, 733--784.
math.OA/9907149.
\bibitem{BEK3}
B\"ockenhauer, J., Evans, D. E. and Kawahigashi, Y. (2001).
Longo-Rehren subfactors arising from $\alpha$-induction.
{\em Publications of the RIMS, Kyoto University}, {\bf 37}, 1--35.
math.OA/0002154.
\bibitem{BG}
de Boer, J. and Goeree, J. (1991).
Markov traces and II$_1$ factors in
conformal field theory.
{\em Communications in Mathematical Physics},
{\bf 139}, 267--304.
\bibitem{Bon}
Bongaarts, P. J. M. (1970).
The electron-positron field, coupled to external
electromagnetic potentials as an elementary
$C^*$-algebra theory. {\em Annals of Physics},
{\bf 56}, 108--138.
\bibitem{Bra}
Bratteli, O. (1972).
Inductive limits of finite dimensional $C^*$-algebras.
{\em Transactions of the American Mathematical Society},
{\bf 171}, 195--234.
\bibitem{BGL1}
Brunetti, R., Guido, D. and Longo, R. (1993).
Modular structure and duality in conformal
quantum field theory.
{\em Communications in Mathematical Physics}, {\bf 156}, 201--219.
\bibitem{BGL2}
Brunetti, R., Guido, D. and Longo, R. (1995).
Group cohomology, modular theory and space-time symmetries.
{\em Reviews in Mathematical Physics}, {\bf 7} 57--71.
\bibitem{BDLR}
Buchholz, D., Doplicher, S., Longo, R. and Roberts, J. E. (1993).
Extensions of automorphisms and gauge symmetries.
{\em Communications in Mathematical Physics},
{\bf 155}, 123--134.
\bibitem{BMT}
Buchholz, D., Mack, G. and Todorov, I. (1988).
The current algebra on the circle as a germ of local field theories.
{\em Nuclear Physics B (Proc. Suppl.)}, {\bf B5}, 20--56.
\bibitem{BS}
Buchholz, D. and Schulz-Mirbach, H. (1990).
Haag duality in conformal quantum field theoery,
{\em Reviews in Mathematical Physics}, {\bf 2} 105--125.
\bibitem{CN}
Camp, W., and Nicoara, R. (preprint 2007).
Subfactors and Hadamard matrices.
arXiv:0704.1128.
\bibitem{CIZ}
Cappelli, A., Itzykson, C. and Zuber, J.-B. (1987).
The $A$-$D$-$E$ classification of minimal and
$A^{(1)}_1$ conformal invariant theories.
{\em Communications in Mathematical Physics}, {\bf 113}, 1--26.
\bibitem{Ca}
Carpi, S. (1998).
Absence of subsystems for the Haag-Kastler net generated by
the energy-momentum tensor in two-dimensional conformal field theory.
{\em Letters in Mathematical Physics}, {\bf 45}, 259--267.
\bibitem{Ca2}
Carpi, S. (2003).
The Virasoro algebra and sectors with infinite statistical dimension.
{\em Annales Henri Poincar\'e}, {\bf 4}, 601--611.
math.OA/0203027.
\bibitem{Ca3}
Carpi, S. (2004).
On the representation theory of Virasoro nets.
{\em Communications in Mathematical Physics}, {\bf 244}, 261--284.
math.OA/0306425.
\bibitem{Ca4}
Carpi, S. (2005).
Intersecting Jones projections.
{\em International Journal of Mathematics}, {\bf 16}, 687--691.
math.OA/0412457.
\bibitem{CC}
Carpi, S. and Conti, R. (2001).
Classification of subsystems for local nets with trivial
superselection structure.
{\em Communications in Mathematical Physics}, {\bf 217}, 89--106.
\bibitem{CC2}
Carpi, S. and Conti, R. (2005).
Classification of subsystems for graded-local nets with trivial
superselection structure.
{\em Communications in Mathematical Physics}.
{\bf 253}, 423--449.
math.OA/0312033.
\bibitem{CKL}
Carpi, S., Kawahigashi, Y. and Longo, R. (in press).
Structure and classification of superconformal nets.
{\em Annales Henri Poincar\'e}.
arXiv:0705.3609.
\bibitem{CW}
Carpi, S. and Weiner, M. (2005).
On the uniqueness of diffeomorphism symmetry in Conformal Field Theory.
{\em Communications in Mathematical Physics},
{\bf 258}, 203--221.
math.OA/0407190.
\bibitem{Ce}
Ceccherini, T. (1996).
Approximately inner and centrally free commuting squares
of type $II_1$ factors and their classification.
{\em Journal of Functioanl Analysis}, {\bf 142}, 296--336.
\bibitem{Chen}
Chen, J. (1993).
The Connes invariant $\chi(M)$ and cohomology of groups.
Ph. D. dissertation at University of California, Berkeley.
\bibitem{Ch1}
Choda, M. (1989).
Index for factors generated by Jones' two sided
sequence of projections.
{\em Pacific Journal of Mathematics}, {\bf 139}, 1--16.
\bibitem{Ch2}
Choda, M. (1991).
Entropy for $*$-endomorphisms and relative entropy
for subalgebras. {\em Journal of Operator Theory},
{\bf 25}, 125--140.
\bibitem{Ch3}
Choda, M. (1992).
Entropy for canonical shift.
{\em Transactions of the American Mathematical Society},
{\bf 334}, 827--849.
\bibitem{Ch4}
Choda, M. (1993).
Duality for finite bipartite graphs
(with applications to II$_1$ factors).
{\em Pacific Journal of Mathematics}, {\bf 158}, 49--65.
\bibitem{Ch5}
Choda, M. (1994).
Square roots of the canonical shifts.
{\em Journal of Operator Theory}, {\bf 31}, 145--163.
\bibitem{Ch6}
Choda, M. (1994).
Extension algebras via $*$-endomorphisms.
in {\em Subfactors ---
Proceedings of the Taniguchi Symposium, Katata ---},
(ed. H. Araki, et al.),
World Scientific, 105--128.
\bibitem{CH}
Choda, M. and Hiai, F. (1991).
Entropy for canonical shifts. II.
{\em Publications of the RIMS, Kyoto University},
{\bf 27}, 461--489.
\bibitem{CK}
Choda, M. and Kosaki, H. (1994).
Strongly outer actions for an inclusion of factors.
{\em Journal of Functional Analysis}, {\bf 122},
315--332.
\bibitem{Chr}
Christensen, E. (1979).
Subalgebras of a finite algebra.
{\em Mathematische Annalen}, {\bf 243}, 17--29.
\bibitem{Com}
Combes, F. (1968).
Poids sur une $C^*$-alg\`ebre.
{\em Journal de Math\'ematiques Pures et
Appliqu\'ees}, {\bf 47}, 57--100.
\bibitem{C1}
Connes, A. (1973).
Une classification des facteurs de type III.
{\em Annales Scientifiques de l'\'Ecole Normale Sup\'erieure},
{\bf 6}, 133--252.
\bibitem{C2}
Connes, A. (1975).
Outer conjugacy classes of automorphisms of factors.
{\em Annales Scientifiques de l'\'Ecole Normale Sup\'erieure},
{\bf 8}, 383--419.
\bibitem{C3}
Connes, A. (1975).
Hyperfinite factors of type III-0 and Krieger's factors.
{\em Journal of Functional Analysis},
{\bf 18}, 318--327.
\bibitem{C4}
Connes, A. (1975).
Sur la classification des facteurs de type II.
{\em Comptes Rendus de l'Academie des Sciences,
S\'erie I, Math\'ematiques}, {\bf 281}, 13--15.
\bibitem{C5}
Connes, A. (1975).
A factor not antiisomorphic to itself.
{\em Annals of Mathematics}, {\bf 101}, 536--554.
\bibitem{C6}
Connes, A. (1976).
Classification of injective factors.
{\em Annals of Mathematics},
{\bf 104}, 73--115.
\bibitem{C7}
Connes, A. (1976).
Outer conjugacy of automorphisms of factors.
{\em Symposia Mathematica}, {\bf XX}, 149--160.
\bibitem{C8}
Connes, A. (1976).
On the classification of von Neumann
algebras and their automorphisms.
{\em Symposia Mathematica}, {\bf XX}, 435--478.
\bibitem{C9}
Connes, A. (1977).
Periodic automorphisms of the hyperfinite factor of type II$_1$.
{\em Acta Scientiarum Mathematicarum},
{\bf 39}, 39--66.
\bibitem{C10}
Connes, A. (1978).
On the cohomology of operator algebras.
{\em Journal of Functional Analysis},
{\bf 28}, 248--253.
\bibitem{C11}
Connes, A. (1979).
Sur la th\'eorie non commutative de l'integration.
{\em Springer Lecture Notes in Math.},
{\bf 725}, 19--143.
\bibitem{C12}
Connes, A. (1980).
$C^*$-algebres et geom\`etrie diff\'erentielle.
{\em Comptes Rendus de l'Academie des Sciences,
S\'erie I, Math\'ematiques},
559--604.
\bibitem{C13}
Connes, A. (1980).
Spatial theory of von Neumann algebras.
{\em Journal of Functional Analysis}, {\bf 35}
(1980), 153--164.
\bibitem{C14}
Connes, A. (1981).
An analogue of the Thom isomorphism for crossed
products of a $C^*$-algebra by an action of
${\bf R}$. {\em Advances in Mathematics},
{\bf 39}, 311--355.
\bibitem{C15}
Connes, A. (1982).
Foliations and Operator Algebras.
{\em Proceedings of Symposia in Pure Mathematics.
ed. R. V. Kadison},
{\bf 38}, 521--628.
\bibitem{C16}
Connes, A. (1982).
Classification des facteurs.
{\em Proceedings of the Symposia in Pure Mathematics (II)},
{\bf 38}, 43--109.
\bibitem{C17}
Connes, A. (1985).
Non-commutative differential geometry I--II.
{\em Publication Math\'ematiques IHES},
{\bf 62}, 41--144.
\bibitem{C18}
Connes, A. (1985).
Factors of type III-1, property $L'_\lambda$ and
closure of inner automorphisms.
{\em Journal of Operator Theory}, {\bf 14}, 189--211.
\bibitem{C19}
Connes, A. (1985).
Non Commutative Differential Geometry,
Chapter II: De Rham homology and non commutative
algebra. {\em Publication Math\'ematiques IHES},
{\bf 62}, 257--360.
\bibitem{C20}
Connes, A. (1994).
Noncommutative geometry.
{\em Academic Press}.
\bibitem{CE}
Connes, A. and Evans, D. E. (1989).
Embeddings of $U(1)$-current algebras in
non-commutative algebras of classical statistical
mechanics. {\em Communications in Mathematical
Physics}, {\bf 121}, 507--525.
\bibitem{CoH}
Connes, A. and Higson, N. (1990).
D\'eformations, morphismes asymptotiques et
$K$-th\'eorie bivariante.
{\em Comptes Rendus de l' Academie des Sciences,
S\'erie I, Math\'ematiques},
{\bf 311}, 101--106.
\bibitem{CKa}
Connes, A. and Karoubi, M. (1988).
Caractere multiplicatif d'un module de Fredholm.
{\em $K$-theory}, {\bf 2} 431--463.
\bibitem{CKr}
Connes, A. and Krieger, W. (1977).
Measure space automorphism groups, the normalizer of their
full groups, and approximate finiteness.
{\em Journal of Functional Analysis}, {\bf 24}, 336--352.
\bibitem{CoR}
Connes, A. and Rieffel, M. (1985).
Yang-Mills for non-commutative tori.
{\em Contemporary Mathematics},
{\bf 62}, 237--265.
\bibitem{CoS}
Connes, A. and Skandalis, G. (1984).
The longitudinal index theorem for foliations.
{\em Publications of the RIMS, Kyoto University},
{\bf 20}, 1139--1183.
\bibitem{CS}
Connes, A. and St\"ormer, E. (1975).
Entropy for automorphisms of $II_1$ von Neumann algebras.
{\em Acta Mathematica}, {\bf 134}, 289--306.
\bibitem{CT}
Connes, A. and Takesaki, M. (1977).
The flow of weights on factors of type III.
{\em Tohoku Mathematical Journal}, {\bf 29}, 73--555.
\bibitem{CDR}
Conti, R., Doplicher, S., and Roberts, J. E. (2001).
Superselection theory for subsystems.
{\em Communications in Mathematical Physics},
{\bf 218}, 263--281.
\bibitem{CP}
Conti, R. and Pinzari, C. (1996).
Remarks on the index of endomorphisms of Cuntz algebras.
{\em Journal of Functional Analysis}, {\bf 142}, 369--405.
\bibitem{Cq}
Coquereaux, R. (2005)
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