\documentstyle[12pt]{article} \begin{document} ************************************************************************* \par {\bf C*-NEWS 44} \hskip8truecm 01*11*1995/30*06*1996 \par ************************************************************************* \bigskip C*-96/P.3601 \hskip1truecm{\bf GOODEARL K.R. } \par C*-Algebras of Real Rank Zero whose $K_)$'s are not \par Riesz Groups \par Department of Mathematics - Univ. California \par Santa Barbara CA 93106 (USA) \par E-MAIL : goodearl@math.ucsb.edu\bigskip C*-96/P.3602 \hskip1truecm{\bf BRATTELI O., JORGENSEN P.E.T. } \par Endomorphisms of B(H) , II: Finitely Correlated States on $O_n$\par Mathematics Institute - Univ. Oslo - PB 1053-Blindern\par N-0316 Oslo (Norway) \par E-MAIL : bratteli@math.uio.no \par\hskip1,9truecm jorgen@math.uiowa.edu\bigskip C*-96/P.3603 \hskip1truecm{\bf THOMSEN K. } \par Limits of certain subhomogeneous C*-Algebras - I \par Matematisk Institut - Ny munkegade - 8000 Aarhus (Denmark)\bigskip C*-96/P.3604 \hskip1truecm{\bf NIELSEN K.E. THOMSEN K. } \par Limits of Circle Algebras\par Matematisk Institut - Ny munkegade - 8000 Aarhus (Denmark)\bigskip C*-96/P.3605 \hskip1truecm{\bf BLECHER D.P. } \par Factorizations in Universal Operator Spaces and Algebras\par Department of Mathematics - Univ. Houston\par Houston TX 77204-3476 (USA)\par E-MAIL : dblecher@math.uh.edu\bigskip C*-96/P.3606 \hskip1truecm{\bf BLECHER D.P. } \par A Completely Bounded Characterization of Operator Algebras\par Department of Mathematics - Univ. Houston\par Houston TX 77204-3476 (USA)\par E-MAIL : dblecher@math.uh.edu\bigskip C*-96/P.3607 \hskip1truecm{\bf BLECHER D.P. } \par A Generalization of Hilbert Modules (final revised version)\par Department of Mathematics - Univ. Houston\par Houston TX 77204-3476 (USA)\par E-MAIL : dblecher@math.uh.edu\bigskip C*-96/P.3608 \hskip1truecm{\bf BLECHER D.P. } \par Continuous functions on Compact Groups\par Department of Mathematics - Univ. Houston\par Houston TX 77204-3476 (USA)\par E-MAIL : dblecher@math.uh.edu\bigskip C*-96/P.3609 \hskip1truecm{\bf BLECHER D.P. Le Merdy C. } \par On Quotients of Function Algebras\par Department of Mathematics - Univ. Houston\par Houston TX 77204-3476 (USA)\par E-MAIL : dblecher@math.uh.edu C*-96/P.3610 \hskip1truecm{\bf EXEL R., LACA M. } \par Continuous Fell Bundles Associated to Measurable Twisted Actions\par Departamento de Matematica - Univ. Sao Paulo - C.P. 20570\par 01452-990 Sao Paulo (Brazil)\par E-MAIL : exel@ime.usp.br \par\hskip1,9truecm marcelo@math.newcastle.edu.au\bigskip C*-96/P.3611 \hskip1truecm{\bf GOTO S. } \par Commutative of Automorphisms of Subfactors Modulo Inner\par Automorphisms\par Department of Mathematical Sciences - Univ. Tokyo -\par Hogo - Tokyo 113 (Japan)\par E-MAIL : s-goto@hoffman.cc.sophia.ac.jp\bigskip C*-96/P.3612 \hskip1truecm{\bf PHILLIPS N.C. } \par A Classification Theorem for Nuclear Purely Infinite Simple\par C*-Algebras\par Department of Mathematics - Univ. Oregon \par Eugene OR 97403-1222 (USA)\bigskip C*-96/P.3613 \hskip1truecm{\bf PHILLIPS N.C. } \par Approximate Unitary Equivalence of Homomorphisms from Odd Cuntz\par Algebras\par Department of Mathematics - Univ. Oregon \par Eugene OR 97403-1222 (USA)\bigskip C*-96/P.3614 \hskip1truecm{\bf LIN H., PHILLIPS N.C. } \par Almost Multiplicative Morphisms and the Cuntz Algebra $O_2$\par Department of Mathematics - Univ. Oregon \par Eugene OR 97403-1222 (USA)\bigskip C*-96/P.3615 \hskip1truecm{\bf MURPHY G.J., PHILLIPS N.C. } \par C*-Algebras with the Approximate Positive Factorization Property \par Department of Mathematics - Univ. Oregon \par Eugene OR 97403-1222 (USA)\bigskip C*-96/P.3616 \hskip1truecm{\bf LIN H., PHILLIPS N.C. } \par Classification of Direct Limits of Even Cuntz-Circle Algebras\par Department of Mathematics - Univ. Oregon \par Eugene OR 97403-1222 (USA)\bigskip C*-96/P.3617 \hskip1truecm{\bf LIN H., PHILLIPS N.C. } \par Approximate Unitary Equivalence of Homomorphisms from $O_2$\par Department of Mathematics - Univ. Oregon \par Eugene OR 97403-1222 (USA)\bigskip C*-96/P.3618 \hskip1truecm{\bf RENAULT J. } \par The Fourier Algebra of a Measured Groupoid and its Multipliers\par D\'epartement de Mat\'ematiques - Univ. orl\'ans - B.P. 6759\par 45067 Orl\'eans (France)\par E-MAIL : renault@univ-orleans.fr\bigskip C*-96/P.3619 \hskip1truecm{\bf JORGENSEN J.E.T.} \par Harmonic Analysis of Fractal Processes via C*-Algebras\par Dpt. Math., Univ. Iowa - Iowa City IA 52242 (USA) \par E-MAIL : jorgen@math.uiowa.edu\bigskip C*-96/P.3620 \hskip1truecm{\bf SYMANSKI W., ZHANG S. } \par Infinite Simple C*-Algebras and Reduced Cross Products of Abelian\par C*-Algebras and Free Groups\par Department of Mathematics, Univ. Newcastle, \par Newcastle NSW 2300 (Australia)\par E-MAIL : wojciech@frey.newcastler.edu.au \par\hskip1,9truecm zhang@ucbeh.san.uc.edu\bigskip C*-96/P.3621 \hskip1truecm{\bf VAN DAELE A. } \par An Algebraic Framework for Group Duality\par Department of Mathematics, Univ. Oslo (Norway)\bigskip C*-96/P.3622 \hskip1truecm{\bf VAN DAELE A. } \par Multiplier Hopf Algebras and Duality\par Department of Mathematics, Univ. Oslo (Norway)\bigskip C*-96/P.3623 \hskip1truecm{\bf QUIGG J. } \par Crossed Product Duality for Partial C*-Automorphisms\par Department of Mathematics, Arizona State Univ., \par Tempe AR 85287 (USA)\par E-MAIL : quigg@math.la.asu.edu\bigskip C*-96/P.3624 \hskip1truecm{\bf RADULESCU F. } \par The Fundamental Group of the Von Neumann Algebra of any \par Cocompact Subgroup in PSL(2,R) Contains Q+/0 \par Harmonic Analysis of Fractal Processes via C*-Algebras\par Dpt. Math., Univ. Iowa - Iowa City IA 52242 (USA)\bigskip C*-96/P.3625 \hskip1truecm{\bf RADULESCU F. } \par Analyse Fonctionnelle/Functional Analysis - Arithmetic Hecke\par Operators as Completely Positive Maps\par Harmonic Analysis of Fractal Processes via C*-Algebras\par Dpt. Math., Univ. Iowa - Iowa City IA 52242 (USA)\bigskip C*-96/P.3626 \hskip1truecm{\bf RADULESCU F. } \par On the Rho-Equivariant Form of the Berezin's Quantization of the\par Upper Half Plane \par Harmonic Analysis of Fractal Processes via C*-Algebras\par Dpt. Math., Univ. Iowa - Iowa City IA 52242 (USA)\bigskip C*-96/P.3627 \hskip1truecm{\bf DELAROCHE C.A. } \par C*-Algebres purement infinies et groupes hyperboliques\par D\'epartement de Math\'ematiques - BP 6759 - Univ. Orl\'eans \par 45067 Orl\'eans Cedex 2 (France)\bigskip C*-96/P.3628 \hskip1truecm{\bf STORMER E. } \par States and Shifts on Infinite Free Products of C*-Algebras\par Institute of Mathematics - Univ. Oslo - P.O. Box 1053 Blindern\par N-0316 OSLO (Norway)\bigskip C*-96/P.3629 \hskip1truecm{\bf FRANK M. } \par Isomorphisms of Hilbert C*-Modules and *-Isomorphisms of\par Related Operator C*-Algebras\par Univ. Leipzig - Fak. Mat. Inf. Institut - Augustusplatz 10/11\par 04109 Leipzig (Germany)\bigskip C*-96/P.3630 \hskip1truecm{\bf DONSIG A.P., HOPENWASSER A. } \par Order Preservation in Limit Algebras\par Department Mathematics - Univ. Lancaster - Lancaster LA1 4YF (U.K.)\par E-MAIL : a.donsig@lancaster.ac.uk \par\hskip1,9truecm ahopenwa@ua1vm.ua.edu\bigskip C*-96/P.3631 \hskip1truecm{\bf EFFROS E.G., WEBSTER C. } \par Operator Analogues of Locally Convex Spaces\par Mathematics Department - UCLA - Los Angeles CA 90024 (USA)\par E-MAIL : ege@math.ucla.edu \par\hskip1,9truecm cwebster@math.ucla.edu\bigskip C*-96/P.3632 \hskip1truecm{\bf VALETTE A. } \par On the Haagerup Inequality and Groups Acting on $A_n$-Building\par Institut de Math\'ematiques - Rue Emile Argand 11\par CH-2007 Neuch\^atel (Suisse)\par E-MAIL : valette@maths.unine.ch\bigskip C*-96/P.3633 \hskip1truecm{\bf KAWAHIGASHI Y. } \par Classification of Approximately Inner Automorphisms of Subfactors\par Department Mathematical Sciences - Univ. Tokyo - Hongo\par Tokyo 113 (Japan)\par E-MAIL : yasuyuki@tansei.cc.u-tokyo.ac.jp\bigskip C*-96/P.3634 \hskip1truecm{\bf SATO N. } \par Fourier Transform for Paragroups and its Application to the\par Depth Two Case\par Department Mathematical Sciences - Univ. Tokyo - Hongo\par Tokyo 113 (Japan)\par E-MAIL : nn57012@hongo.ecc.u-tokyo.ac.jp\bigskip C*-96/P.3635 \hskip1truecm{\bf MCCANN P.J., CAREY A.L. } \par A Discrete Model of the Integer Quantum Hall Effect\par Department of Pure Mathematics - Univ. Adelaide (Australie)\bigskip C*-96/P.3636 \hskip1truecm{\bf EFFROS E.G., WINKLER S. } \par Matrix Convexity : Operator Analogues of the Bipolar and Hahn-\par Banach Theorems\par Mathematics Department - UCLA - Los Angeles CA 90024 (USA)\bigskip C*-96/P.3637 \hskip1truecm{\bf DADARLAT M., LORING T.A. } \par A Universal Multi-Coefficient Theorem for the Kasparov Groups\par Department of Mathematics and Statistics - Purdue Univ.\par West Lafayette IN 47907 (USA)\bigskip C*-96/P.3638 \hskip1truecm{\bf HADWIN D., LORING T.A. } \par Normal Operators in C*-Algebras without Nice Approximants\par Department of Mathematics and Statistics - Purdue Univ.\par West Lafayette IN 47907 (USA)\bigskip C*-96/P.3639 \hskip1truecm{\bf FRANK M., TROITSKY E. } \par Leftchetz Numbers and Geometry of Operators in W*-Modules\par Univ. Leipzig ` Fak. Mat. Inf. Institut - Augustusplatz 10/11\par 04109 Leipzig (Germany)\bigskip C*-96/P.3640 \hskip1truecm{\bf KATAYAMA Y., SUTHERLAND C.E., \par \par \hskip3,7truecm TAKESAKI M. } \par The Characteristic Square of a Factor and the Cocycle Conjugacy\par of Discrete Group Actions on Factors\par Department of Mathematics - Univ. California - \par Los Angeles 90095-1555 (USA)\bigskip C*-96/P.3641 \hskip1truecm{\bf FRIIS P., RORDAM M. } \par Almost Commuting Self-Adjoint Matrices - A Short Proof of\par Huaxin Lin's Theorem\par Institut for Matematik of Datalogi - Odense Univ.\par Campusvej 55 - DK-5230 Odense (Denmark)\par E-MAIL : friis@math.toronto.edu \par\hskip1,9truecm mikael@imada.ou.dk\bigskip C*-96/P.3642 \hskip1truecm{\bf GOTO S. } \par Quantum Double Construction for Subfactors Arising from \par Periodic Commuting Squares\par Department Mathematics - Sophia Univ. \par 7-1 Kioi-cho - Chiyoda-ku - Tokyo 102 (Japan)\par E-MAIL : s-goto@hoffman.cc.sophia.ac.jp\bigskip C*-96/P.3643 \hskip1truecm{\bf SATO N. } \par Two Subfactors Arising from a Non-Degenerate Commuting Square\par II. Tensor Categories and TQFT's\par Dept. Mathematical Sciences - Univ. Tokyo - Komaba -\par Tokyo 153 (Japan) E-MAIL : nobuya@ms.u-tokyo.ac.jp\bigskip C*-96/P.3644 \hskip1truecm{\bf MASUDA T. } \par An Analogue of Longo's Canonical Endomorphism for Bimodule Theory\par and its Application to Asymptotic Inclusions\par Dept. Mathematical Sciences - Univ. Tokyo - Komaba -\par Tokyo 153 (Japan) E-MAIL : masuda@ms.u-tokyo.ac.jp\bigskip \end{document}