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Riemann-Roch and topological K-theory for singular varieties. (English) Zbl 0474.14004


MSC:

14C40 Riemann-Roch theorems
55R50 Stable classes of vector space bundles in algebraic topology and relations to \(K\)-theory
14C35 Applications of methods of algebraic \(K\)-theory in algebraic geometry
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[1] Atiyah, M. F. &Hirzebruch, F., The Riemann-Roch theorem for analytic embeddings.Topology, 1 (1961), 151–166. · Zbl 0108.36402 · doi:10.1016/0040-9383(65)90023-6
[2] Baum, P., K-homology. To appear.
[3] Baum, P., Fulton, W. &MacPherson, R., Riemann-Roch for singular varieties.Publ. Math. IHES, 45 (1975), 101–167. · Zbl 0332.14003
[4] Baum, P., Fulton, W. & Quart, G.,Lefschetz-Riemann-Roch for singular varieties. Following article. · Zbl 0357.14004
[5] Berthelot, P., Grothendieck, A., Illusie, L., et al.,Théorie des intersections et théorème de Riemann-Roch. Springer Lecture Notes in Mathematics, 225 (1971). · Zbl 0218.14001
[6] Borel, A. &Moore, J. C., Homology theory for locally compact spaces.Michigan Math. J., 7 (1960), 137–159. · Zbl 0116.40301 · doi:10.1307/mmj/1028998385
[7] Borel, A. &Serre, J.-P., Le théorème de Riemann-Roch, d’après A. Grothendieck.Bull. Soc. Math. France, 86 (1958), 97–136.
[8] Dyer, E.,Cohomology theories. W. A. Benjamin, New York (1969).
[9] Fulton, W., A Hirzebruch-Riemann-Roch formula for analytic spaces and non-projective algebraic varieties.Compositio Math., 34 (1977), 279–283. · Zbl 0367.14008
[10] Fulton, W. A note on the arithmetic genus. To appear inAmer. J. Math.
[11] Fulton, W. & MacPherson, R., Intersecting cycles on an algebraic variety.Real and complex singularities, Oslo, 1976,Sijthoff & Noordhoff (1978), 179–197.
[12] Grothendieck, A. & Dieudonne, J., Eléments de géométrie algébrique.Publ. Math. IHES Nos. 4 (1960), 8 (1961), 11 (1961).
[13] Iversen, B., Local Chern classes.Ann. Sci. École Norm. Sup., 4e série, 9 (1976), 155–169. · Zbl 0328.14006
[14] Serre, J.-P., Faisceaux algébriques cohérents.Ann. of Math., 61 (1955), 197–278. · Zbl 0067.16201 · doi:10.2307/1969915
[15] Verdier, J.-L., Le théorème de Riemann-Roch pour les intersections complètes.Seminaire de géometrie analytique de l’École Normale Supérieure 1974–75. Exposé IX,Astérique 36–37 (1976), 189–228.
[16] Whitehead, G. W., Generalized homology theories.Trans. Amer. Math. Soc., 102 (1962), 227–283. · Zbl 0124.38302 · doi:10.1090/S0002-9947-1962-0137117-6
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