BIBLIOGRAPHY ON THE COMPLETELY DECOMPOSED ...
BIBLIOGRAPHY ON THE COMPLETELY DECOMPOSED ...
BIBLIOGRAPHY ON THE COMPLETELY DECOMPOSED ...
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math.AG/0608313, Aug. 2006, pp. 1-31.<br />
117. F. Morel, Rationalized motivic sphere spectrum and rational motivic cohomology,<br />
Preprint, 2006, pp. 1-9; available at http : //www.mathematik.uni −<br />
muenchen.de/ ∼ morel<br />
118. S. Schwede, Shipley B., Classification of stable modul categories, Classification<br />
of stable model categories, Preprint, 200??, pp. 1-43.<br />
119. O. Roendigs, Functoriality in motivic homotopy theory, Preprint, 2006,<br />
pp. 1-60, available at http : //www.mathematik.uni − bielefeld.de/ ∼<br />
oroendig/functoriality.dvi.<br />
120. M. Severitt, Motivic homotopy types of projective curves, Univ. Beilefeld, Diplomarbeit,<br />
2006, Preprint, pp. 1-99, available at http : //www.mathematik.uni −<br />
bielefeld.com/ ∼ mseverit/mseverittse.pdf or www.math.uni−bielefeld.de/ ∼<br />
rost/data mseveritt.ps<br />
121. N. Rozenblum, Motivic homotopy theory and power operations in motivic cohomology,<br />
Thesis, Harvard Univ., 2006, pp. 1-40, http : //math.mit.edu/ ∼<br />
nrozen/papers/motivic.pdf<br />
122. A. Asok, B. Doran, On unipotent quotients and some A 1 - contractable smooth<br />
schemes, Internat. Math. Research Papers, (2007), no. 5, pp. 1-51; see<br />
also http : //imrp.oxfordjournals.org/cgi/reprint/2007/rpm005/rpm005.pdf;<br />
an older version available at arxiv : math/0703137v2 [math.AG], pp. 1-40.<br />
123. B. I. Dundas, Prerequisites in Algebrtaic Topology, in: ”Motivic Homotopy Theory”,<br />
Lectures at the Summer School at Nordfjordeid, 2002, Berlin, Springer,<br />
2007 (see item I.46 above), pp. 1-60; see also http : //www.math.ntnu.no/ ∼<br />
dundas.<br />
124. V. Voevodsky, Lectures on motivic stable homotopy theory, in: ”Motivic<br />
Homotopy Theory”, Lectures at a Summer School at Nordfjordeid, 2002,<br />
Berlin Springer, 2007, pp. 147-221 (see item I.43 above), see also http :<br />
//www.uwo.edu/ ∼ oroendigs.<br />
125. J. Riou, Catégorie homotopique stable d’un site suspendu avec intervalle,<br />
Bull. Soc. Math. France, t. 135(2007?), pp. 495-547. see also http :<br />
//www.math.uiuc.edu/K − theory, no. 825, 2007, pp. 1-52; or http :<br />
//www.math.jussieu.fr/ ∼ riou,<br />
126. F. Morel, Rational stable splitting of Grassmannian and rational motivic<br />
sphere spectrum, Preprint, pp. 1-13, 2007??, available at http :<br />
//www.mathematik.uni − munchen.de/ ∼ morel<br />
127. I. Panin, K. Pimenov, O. Rondigs, On Voevodsky’s algebraic K- theory spectrum,<br />
in: Algebraic Topology: The Abel Symposium 4, eds: N. Baas, E. Friedlander, P.-<br />
A. Ostvaer, pp. 279-330, Springer, 2009; see also arXiv:0709.3905v1, [math.AG];<br />
an older version at http : //www.math.uiuc.edu/K − theory, no. 8??.<br />
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