BIBLIOGRAPHY ON THE COMPLETELY DECOMPOSED ...
BIBLIOGRAPHY ON THE COMPLETELY DECOMPOSED ...
BIBLIOGRAPHY ON THE COMPLETELY DECOMPOSED ...
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E-print, 23 Nov. 2010, pp. 1-6, arXiv:1011.4977v1, [math.KT].<br />
87. A. J. Berrick, M. Karoubi, M. Schlichting, P. A. Ostvaer, The homotopy fixed<br />
point theorem and the Quillen-Lichtenbaum conjecture in hermitian K-theory,<br />
E-print, pp. 1-16, arXive:1011.4977v2, [math.KT], Aug. 25, 2011; also K-theory<br />
archive, http : //www.math.uiuc.edu/K − theory, no. 1009, pp. 1-16.<br />
88. A. Knizel, A. Neshitov, Algebraic analogue of atiyah’s theorem, E-print, Ktheory<br />
archive, http : //www.math.uiuc.edu/K − theory, no. 1016, Nov. 20,<br />
2011, pp. 1-18.<br />
89. S. Kelly, Vanishing of negative K-theory in positive characteristic, E-print, pp.<br />
1-15, Dec. 23, 2011, arXiv: 1112: 5206v1, [math.AG].<br />
90. A. Krishna, Completion theorem for equivariant K-theory, E-print, pp. 1-38,<br />
arXiv:1201.5766v1, [math.AG], 27 Jan. 2012.<br />
91. Witt groups of complex varieties, Preprint, Oct. 2011, http : //www2.math.uni−<br />
wuppertal.de/ ∼ zibrowiu/pdf/Zibrowius,<br />
5. APPLICATI<strong>ON</strong>S TO A STUDY OF ALGEBRAIC<br />
CYCLES, <strong>THE</strong>IR INTERSECTI<strong>ON</strong>S AND <strong>THE</strong><br />
PICARD AND HIGHER CHOW GROUPS<br />
1. Ye. Nisnevich, see item II-4.2 above.<br />
2. A. A. Suslin, Algebraic K-theory and Motivic cohomology, ICM 1992 in Zurich,<br />
see item I-6 above.<br />
3. C. Pedrini, C. Weibel, The divisibility of the Chow group of zero cycles on singular<br />
surfaces, K-théorie, Les contributions du Colloque Internationelle, Strassbourg,<br />
Asterisque, t. 226 (1994), pp. 371- 409.<br />
4. Ch. Weibel, Picard group is a contractible functor, Invent. Math., v. 103 (1991),<br />
351-377.<br />
5. B. Kahn, A sheaf-theoretic reformulation of the Tate Conjecture, Preprint, 1997,<br />
pp. 1-53, in http : //www.math.uiuc.edu/K − theory, no. 247.<br />
6. A. Suslin, V. Voevodsky, Relative Cycles and Chow sheaves, in: Voevodsky,<br />
Suslin, Friedlander, ”Cycles, Transfers and Motivic Cohomology Theories”,<br />
Ann. of Math. Studies, v. 143, 2000, pp. 10-86; see also http :<br />
//www.math.uiuc.edu/K − theory, No. 35, 1994.<br />
7. E. M. Friedlander, V. Voevodsky, Bivariant cycles cohomology, in: V. Voevodsky,<br />
A. Suslin, E. Friedlander, ”Cycles, Transfers and Motivic Homology Theories”,<br />
Annals of Math. Studies, v. 143, 2000, Princeton Univ. Press. pp. 138-187; see<br />
also http : //www.math.uiuc.edu/K − theory, no. 368, s?, 1999.<br />
8. A. Vishik, Integral motives of quadrics, Preprint, MPI-1998-13, pp. 1-<br />
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