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Reduced power operations in motivic cohomology. (English) Zbl 1057.14027
Cohomology operations are very familiar from algebraic topology, where they form a basic toolkit of great power and applicability. Their theory has been extensively developed by N. Steenrod, J. Milnor, and others some decades ago [N. E. Steenrod, Cohomology. Ann. Math. Stud. 50 (1962; Zbl 0102.38104)], later on also in the framework of \(K\)-theory.
In the paper under review, the author develops a theory of cohomology operations in the motivic cohomology of smooth simplicial schemes over a perfect field \(k\) with coefficients in \(\mathbb{Z}/\ell\), where \(\ell\) is a prime number different from the characteristic of the field \(k\). In this context, he constructs the so-called reduced power operations in motivic cohomology, establishes the motivic analogues of the classical Cartan formulas and the Adem relations, describes explicitely the subalgebra generated by these reduced power operations \(P^i\) in the algebra of all (bistable) operations in the motivic cohomology, characterizes an analogue of the Bockstein operator and analyzes the multiplication by the motivic cohomology classes of \(\text{Spec}(k)\). This includes a thorough comparison of the usual topological Steenrod algebra and the motivic Steenrod algebra, the construction of the Thom isomorphism in motivic cohomology, the description of Euler classes of vector bundles in this framework, the analysis of the dual of the motivic Steenrod algebra, and the interrelation between motivic cohomology operations and characteristic classes.
This highly original and pioneering program is carried out in the fourteen sections of the present paper, with a wealth of ingenious new ideas and novel, extremely subtle and fundamental constructions. Whereas the introduction of the motivic reduced power operations via the so-called total power operation follows the classical approach in topology (à la Steenrod-Epstein [loc. cit.]), the author’s construction of the motivic total power operation is completely new and different from any of the standard topological constructions. However, as the author points out, there is a way to obtain the topological analogue of the motivic total operation in terms of Eilenberg-MacLane spectra.
Apart from providing a good deal of this novel theory of motivic cohomology operations, whose completion is still in progress and will be published in the sequel, the present comprehensive paper contains all the rigorous proofs of the results on motivic cohomology operations that the author had already used in his earlier, very spectacular proof of the celebrated Milnor conjecture back in 1996 [V. Voevodsky, The Milnor conjecture, Electronic publication: http://www.math.uiuc.edu/K-theory/170]. Together with some corrections and improvements, the present paper completes that foregoing paper ultimately. Despite its highly advanced, conceptually involved and extremely innovating character, the material is exhibited in a very lucid, detailed and well-organized manner, which is very gratifying in view of its fundamental importance for further research in this central area of contemporary algebraic geometry.

MSC:
14F42 Motivic cohomology; motivic homotopy theory
19E15 Algebraic cycles and motivic cohomology (\(K\)-theoretic aspects)
55S10 Steenrod algebra
55S05 Primary cohomology operations in algebraic topology
14F05 Sheaves, derived categories of sheaves, etc. (MSC2010)
14F45 Topological properties in algebraic geometry
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References:
[1] S. Bloch, The moving lemma for higher Chow groups, J. Algebr. Geom., 3(3) (1994), 537–568. · Zbl 0830.14003
[2] J. M. Boardman, The eightfold way to BP-operations, In Current trends in algebraic topology, pp. 187–226. Providence: AMS/CMS, 1982.
[3] P. May, A general algberaic approach to Steenrod operations, In The Steenrod algebra and its applications, volume 168 of Lecture Notes in Math., pp. 153–231, Springer, 1970.
[4] V. Voevodsky, C. Mazza, and C. Weibel, Lectures on motivic cohomology, I, www.math.ias.edu/ladimir/seminar.html, 2001. · Zbl 1115.14010
[5] J. Milnor, The Steenrod algebra and its dual, Annals of Math., 67(1) (1958), 150–171. · Zbl 0080.38003
[6] J. Milnor, Algebraic K-theory and quadratic forms, Invent. Math., 9 (1970), 318–344. · Zbl 0199.55501
[7] F. Morel and V. Voevodsky, A 1-homotopy theory of schemes, Publ. Math. IHES, 90 (1999), 45–143. · Zbl 0983.14007
[8] N. E. Steenrod and D. B. Epstein, Cohomology operations, Princeton: Princeton Univ. Press, 1962.
[9] A. Suslin and V. Voevodsky, Bloch-Kato conjecture and motivic cohomology with finite coefficients, In The arithmetic and geometry of algebraic cycles, pp. 117–189, Kluwer, 2000. · Zbl 1005.19001
[10] V. Voevodsky, The Milnor Conjecture, www.math.uiuc.edu/K-theory/170, 1996.
[11] V. Voevodsky, Triangulated categories of motives over a field, In Cycles, transfers and motivic homology theories, Annals of Math Studies, pp. 188–238, Princeton: Princeton Univ. Press, 2000. · Zbl 1019.14009
[12] V. Voevodsky, Lectures on motivic cohomology 2000/2001 (written by P. Deligne), www.math.ias.edu/ladimir/rear.html, 2000/2001. · Zbl 1005.19001
[13] V. Voevodsky, Cancellation theorem, www.math.uiuc.edu/K-theory/541, 2002.
[14] V. Voevodsky, Motivic cohomology groups are isomorphic to higher Chow groups in any characteristic, Int. Math. Res. Not. 7 (2002), 351–355. · Zbl 1057.14026
[15] V. Voevodsky, Motivic cohomology with Z/2-coefficients, Publ. Math. IHES (this volume), 2003. · Zbl 1057.14028
[16] V. Voevodsky, E. M. Friedlander, and A. Suslin, Cycles, transfers and motivic homology theories, Princeton: Princeton University Press, 2000. · Zbl 1021.14006
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