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On a class of Hilbert C*-manifolds 225[8] D. Mittenhuber and K.-H. Neeb, On the exponential function of an ordered manifold withaffine connection, Math. Z. 218 (1995), 1–23.[9] M. Neal and B. Russo, Operator space characterizations of C*-algebras and ternary rings,Pacific J. Math. 209 (2003), 339–364.[10] W. Werner, Hilbert C*-manifolds with Levi-Civitá connection, in preparation.[11] H. Zettl, A characterization of ternary rings of operators, Adv. in Math. 48 (1983), 117–143.
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EMS Series of Congress ReportsEMS S
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Editors:Guillermo CortiñasDepartam
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ContentsPreface....................
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IntroductionSince its inception 50
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Introductionxiwith D. Blecher, he c
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Program list of speakers and topics
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Categorical aspects of bivariant K-
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42 A. Bartels, S. Echterhoff, and W
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72 H. Emerson and R. MeyerIn this s
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74 H. Emerson and R. MeyerK-theoret
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76 H. Emerson and R. MeyerExample 4
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78 H. Emerson and R. Meyerand exact
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80 H. Emerson and R. Meyercondition
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82 H. Emerson and R. MeyerAs a resu
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84 H. Emerson and R. MeyerLet h and
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86 H. Emerson and R. MeyerCorollary
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88 H. Emerson and R. Meyer5 Dual-Di
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On K 1 of a Waldhausen categoryFern
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On K 1 of a Waldhausen category 93t
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On K 1 of a Waldhausen category 95(
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On K 1 of a Waldhausen category 97s
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On K 1 of a Waldhausen category 992
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118 M. Karoubi[35], M. F. Atiyah an
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120 M. Karoubihere by GrK n .A/, ar
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122 M. Karoubi(resp. 1) in A. In th
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124 M. Karoubithe class ˛ of A in
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126 M. Karoubiested in the complex
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128 M. KaroubiThe same method may b
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130 M. KaroubiBy the usual excision
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132 M. KaroubiLet A be a graded twi
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134 M. Karoubithe same ideas as in
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136 M. KaroubiTheorem 6.2. 25 The (
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138 M. KaroubiIn order to show this
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140 M. KaroubiThe following theorem
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142 M. KaroubiWe would like to poin
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144 M. KaroubiZ=n identified with t
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146 M. Karoubiwhere n is the ring
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148 M. Karoubi[6] M. F. Atiyah, R.
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Equivariant cyclic homology for qua
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Page 189 and 190: 174 C. Voigtand using ˇ.x; y/ D .S
Page 191 and 192: 176 C. Voigtalgebra A. The space Cn
Page 193 and 194: 178 C. VoigtKK-theory [16]. Hence,
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Page 219 and 220: 204 J. CuntzConsider the action of
Page 221 and 222: 206 J. Cuntzprime numbers p and q,
Page 223 and 224: 208 J. Cuntz6 Representations as cr
Page 225 and 226: 210 J. CuntzProof. The spectral pro
Page 227 and 228: 212 J. CuntzThe operator s 1 plays
Page 229 and 230: 214 J. CuntzProposition 7.4. The K-
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Page 242 and 243: Duality for topological abelian gro
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Duality for topological abelian gro
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350 P. Bressler, A. Gorokhovsky, R.
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394 G. Garkusha and M. Prest2. the
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396 G. Garkusha and M. PrestProof.
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398 G. Garkusha and M. Prestranges
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400 G. Garkusha and M. Prest(A thic
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402 G. Garkusha and M. Prestof Inj
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404 G. Garkusha and M. PrestLemma 5
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406 G. Garkusha and M. PrestLemma 6
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408 G. Garkusha and M. Prest(L4) Th
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410 G. Garkusha and M. Prestis indu
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412 G. Garkusha and M. PrestReferen
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414 T. Geisserfrom higher Chow grou
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416 T. Geisserd) ) b): follows by w
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418 T. GeisserProof. The statement
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420 T. Geisser1 0, henceConjecture
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422 T. GeisserProposition 4.3. The
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424 T. Geisserwe have the isomorphi
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Axioms for the norm residue isomorp
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438 List of contributorsFernando Mu
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440 List of participantsAmnon Neema
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