This is a preview of subscription content, log in via an institution to check access.
Access this chapter
Tax calculation will be finalised at checkout
Purchases are for personal use only
Preview
Unable to display preview. Download preview PDF.
References
[A] Atiyah, M.F.: New invariants of 3-and 4-dimensional manifolds. In: The Mathematical Heritage of Herman Weyl, Proc. Symp. Pure Math. 48, 285–299 (1988)
[AB] Atiyah, M.F., Bott, R.: The Yang-Mills equations over Riemann surfaces. Phil. Trans. R. Soc. London A 308, 523–615 (1982)
[AK] Altman, A.B., Kleiman, S.L.: Compactifying the Picard Scheme. Advances in Math. 35, 50–112 (1980)
[AHS] Atiyah, M.F., Hitchin, N.J., Singer, I.M.: Self duality in four dimensional Riemannian geometry. Proc. Roy. Soc. London A 362, 425–461 (1978)
[Ba] Barlow, R.: A simply connected surface of general type with p g =0. Invent. math. 79, 293–301 (1985)
[B] Barth, W.: Moduli of vector bundles on the projective plane. Invent. math. 42, 63–91 (1977)
[BPV] Barth, W., Peters, Ch., Van de Ven, A.: Compact complex surfaces. Erg. der Math. (3) 4. Berlin, Heidelberg, New York: Springer 1985
[Bau] Bauer, S.: Parabolic bundles, elliptic surfaces and SU (2)-representation spaces of genus zero Fuchsian groups. Preprint 67, MPI Bonn, 1989
[BO] Bauer, S., Okonek, C.: The algebraic geometry of representation spaces associated to Seifert fibered homology 3-spheres. Math. Ann. 286, 45–76 (1990)
[Br] Brieskorn, E.: Rationale Singularitäten komplexer Flächen. Invent. math. 4, 336–358 (1968)
[DI] Deligne, P., Illusie, L.: Relèvements modulo p 2 et décomposition du complex de de Rham. Invent. math. 89, 247–270 (1987)
[Do1] Dolgachev, I.: Algebraic surfaces with q=p g=0. In: Algebraic Surfaces, C.I.M.E., p. 97–215 Liguori, Napoli (1981)
[Do2] Dolgachev, I.: Weighted projective varieties. In: Carrell, J.B. (ed.) Group actions and vector fields. Proc. Vancouver 1981. LNM 956, 34–71, Berlin, Heidelberg, New York: Springer 1982
[D1] Donaldson, S.K.: Anti-self-dual Yang-Mills connections over complex algebraic surfaces and stable vector bundles. Proc. London Math. Soc. 50, 1–26 (1985)
[D2] Donaldson, S.K.: Connections, cohomology and the intersection forms of 4-manifolds. J. Diff. Geom. 24, 275–341 (1986)
[D3] Donaldson, S.K.: Irrationality and the h-cobordism conjecture. J. Diff. Geom. 26, 141–168 (1987)
[D4] Donaldson, S.K.: Polynomial invariants for smooth 4-manifolds. Topology, to appear
[D5] Donaldson, S.K.: The orientation of Yang-Mills moduli spaces and 4-manifold topology. J. Diff. Geom., to appear
[D6] Donaldson, S.K.: Letter to the author, December 1988
[D7] Donaldson, S.K.: Talk at Durham, July 1989
[EO1] Ebeling, W., Okonek, C.: Donaldson invariants, monodromy groups, and singularities. International Journal of Math., to appear
[EO2] Ebeling, W., Okonek, C.: On the diffeomorphism groups of certain algebraic surfaces. Preprint, Bonn 1990
[EN] Eisenbud, D., Neumann, W.D.: Three-dimensional link theory and invariants of plane curve singularities. Annals of Math. Studies 110, Princeton University Press, Princeton 1985
[EF] Elencwajg, G., Forster, O.: Vector bundles on manifolds without divisors and a theorem on deformations. Ann. Inst. Fourier, Grenoble 32, 4, 25–51 (1982)
[FS1] Fintushel, R., Stern, R.: SO (3)-connections and the topology of 4-manifolds. J. Diff. Geom. 20, 523–539 (1984)
[FS2] Fintushel, R., Stern, R.: Instanton homology of Seifert fibered homology 3-spheres. Preprint, Univ. of Utah, Salt Lake City (1988)
[FS3] Fintushel, R., Stern, R.: Homotopy K3 surfaces containing Σ(2, 3, 7). Preprint, Univ. of Utah, Salt Lake City (1988)
[F] Floer, A.: An instanton invariant for 3-manifolds. Commun. Math. Phys. 118, 215–240 (1988)
[FU] Freed, D., Uhlenbeck, K.K.: Instantons and four-manifolds. M.S.R.I. publ. no. 1. New York, Berlin, Heidelberg, Tokyo: Springer 1984
[Fr] Freedman, M.: The topology of 4-manifolds. J. Diff. Geom. 17, 357–454 (1982)
[FT] Freedman, M., Taylor, L.: Λ-splitting 4-manifolds. Topology 16, 181–184 (1977)
[FM1] Friedman, R., Morgan, J.W.: Algebraic surfaces and 4-manifolds: some conjectures and speculations. Bull. A.M.S. Vol. 18, No. 1, 1–19 (1988)
[FM2] Friedman, R., Morgan, J.W.: On the diffeomorphism types of certain algebraic surfaces I. J. Diff. Geom. 27, 297–369 (1988)
[FM3] Friedman, R., Morgan, J.W.: On the diffeomorphism type of certain algebraic surfaces II. J. Diff. Geom. 27, 371–398 (1988)
[FM4] Friedman, R., Morgan, J.W.: Complex versus differentiable classification of algebraic surfaces. Preprint, New York (1988)
[FMM] Friedman, R., Moishezon, B., Morgan, J.W.: On the C ∞ invariance of the canonical classes of certain algebraic surfaces. Bull. A.M.S. Vol. 17, No. 2, 283–286 (1987)
[FuS] Fujiki, A., Schuhmacher, G.: The moduli space of Hermite-Einstein bundles on a compact Kähler manifold. Proc. Japan Acad. 63, 69–72 (1987)
[FSt] Furuta, M., Steer, B.: The moduli spaces of flat connections on certain 3-manifolds. Preprint, Oxford (1989)
[G] Gieseker, D.: On the moduli of vector bundles on an algebraic surface. Ann. of Math. 106, 45–60 (1977)
[Go] Gompf, R.E.: Nuclei of elliptic surfaces. Preprint, Univ. of Texas, Austin, 1989
[GH] Griffiths, P., Harris, J.: Residues and zero-cycles on algebraic varieties. Ann. of Math. 108, 461–505 (1978)
[H] Hempel, J.: Three-Manifolds. Annals of Math. Studies 86, Princeton University Press, Princeton, 1967
[Hi] Hirzebruch, F.: Topological methods in algebraic geometry. Grundlehren der math. Wiss. 131 (third edition). Berlin, Heidelberg, New York: Springer 1966
[HH] Hirzebruch, F., Hopf, H.: Felder von Flächenelementen in 4-dimensionalen Mannigfaltigkeiten. Math. Ann. 136, 156–172 (1956)
[I 1] Itoh, M.: On the moduli space of anti-self dual connections on Kähler surfaces. Publ. R.I.M.S. Kyoto Univ. 19, 15–32 (1983)
[I 2] Itoh, M.: The moduli space of Yang-Mills connections over a Kähler surface is a complex manifold. Osaka J. Math. 22, 845–862 (1985)
[Ki] Kim, H.J.: Moduli of Hermite-Einstein vector bundles. Math. Z. 195, 143–150 (1987)
[KK] Kirk, P.A., Klassen, E.P.: Representation spaces of Seifert fibered homology spheres. Preprint, California Institute of Tech., Pasadena (1989)
[K1] Kobayashi, S.: First Chern class and holomorphic tensor fields. Nagoya Math. J. 77, 5–11 (1980)
[K2] Kobayashi, S.: Differential geometry of complex vector bundles. Iwanami Shoten and Princton University Press (1987)
[Ko] Kodaira, K.: On homotopy K3 surfaces. In: Essays on topology and related topics (ded. G. de Rham) 58–69. Berlin, Heidelberg, New York: Springer 1970
[Kot] Kotschick, D.: On manifolds homeomorphic CP 2≯8C \(\bar P^2 \). Invent. math. 95, 591–600 (1989)
[Ku] Kuranishi, M.: A new proof for the existence of locally complete families of complex structures. In: Aeppli, A., Calabi, E., Röhrl, H. (eds.): Proc. of the conference on complex analysis, Minneapolis 1964, 142–154, Berlin, Heidelberg, New York: Springer 1965
[La] Lamotke, K.: The topology of complex projective varieties after S. Lefschetz. Topology 20, 15–51 (1981)
[L] Lawson, H.B.: The theory of gauge fields in four dimensions. Regional Conf. Series, A.M.S. 58. Providence, Rhode Island 1985
[Lo] Looijenga, E.J.N.: Isolated singular points on complete intersections. London Math. Soc. Lecture Note Series 77. Cambridge University Press, Cambridge 1984
[Lü1] Lübke, M.: Chernklassen von Hermite-Einstein Vektorbündeln. Math. Ann. 260, 133–141 (1982)
[Lü2] Lübke, M.: Stability of Einstein-Hermitian vector bundles. Manuscr. Math. 42, 245–257 (1983)
[LO] Lübke, M., Okonek, C.: Moduli spaces of simple bundles and Hermitian-Einstein connections. Math. Ann. 267, 663–674 (1987)
[Ma] Mandelbaum, R.: Four-dimensional topology: an introduction. Bull. A.M.S., Vol. 2, No. 1, 1–159 (1980)
[Mar] Margerin, C.: Fibres stables et metriques d’Hermite-Einstein. Sém. Bourbaki, no. 683 (1987)
[M1] Maruyama, M.: Stable bundles on an algebraic surface. Nagoya Math. J. 58, 25–68 (1975)
[M2] Maruyama, M.: Moduli of stable sheaves I. J. Math. Kyoto Univ. 17, 91–126 (1977)
[M3] Maruyama, M.: Moduli of stable sheaves II. J. Math. Kyoto Univ. 18, 557–614 (1978)
[M4] Maruyama, M.: Elementary transformations in the theory of algebraic vector bundles. In: Aroca, J.M., Buchweitz, R., Giusti, M., Merle, M. (ed.): Algebraic Geometry, Proc. La Ràbida, LNM 961, 241–266, Berlin, Heidelberg, New York: Springer 1982
[Mi] Miyajima, K.: Kuranishi family of vector bundles and algebraic description of the moduli space of Einstein-Hermitian connections. Publ. R.I.M.S. Kyoto Univ. 25, 301–320, (1989)
[Mo1] Mong, K.-C. On some possible formulation of differential invariants for 4-manifolds. Preprint 34, MPI Bonn (1989)
[Mo2] Mong, K.-C.: Polynomial invariants for 4-manifolds of type (1, n) and a calculation for S 2×S2. Preprint 37, MPI Bonn (1989)
[Mu] Mukai, S.: Symplectic structure of the moduli space of sheaves on an abelian or K3 surface. Invent. math. 77, 101–116 (1984)
[NR] Neumann, W.D., Raymond, F.: Seifert manifolds, plumbing, μ-invariant, and orientation reversing maps. In: Millet, K.C. (ed.) Algebraic and geometric topology, Proc. Santa Barbara 1977 LNM 664, 162–196, Berlin, Heidelberg, New York: Springer 1978
[NW] Neumann, W., Wahl, J.: Casson invariants of links of singularities. Comment. Math. Helv. 65, 58–78 (1990)
[O] Okonek, C.: On the Floer homology of Seifert fibered homology 3-spheres. In: Proceedings, Durham 1989 (to appear)
[OSS] Okonek, C., Schneider, M., Spindler, H.: Vector bundles over complex projective spaces. Progress in Math. 3. Boston, Basel, Stuttgart: Birkhäuser 1980
[OV1] Okonek, C., Van de Ven, A.: Stable bundles and differentiable structures on certain elliptic surfaces. Invent. math. 86, 357–370 (1986)
[OV2] Okonek, C., Van de Ven, A.: Γ-type-invariants associated to PU (2)-bundles and the differentiable structure of Barlow’s surface. Invent. math. 95, 601–614 (1989)
[OV3] Okonek, C., Van de Ven, A.: Instantons, stable bundles and C ∞-structures on algebraic surfaces. Preprint, Bonn (1989)
[P] Pinkham, H.: Normal surface singularities with ℂ*-action. Math. Ann. 227, 183–193 (1977)
[Q] Quinn, F.: Isotopy of 4-manifolds. J. Diff. Geom. 24, 343–372 (1986)
[Sch] Schwarzenberger, R.L.E.: Vector bundles on algebraic surfaces. Proc. London Math. Soc. (3) 11, 601–623 (1961)
[S] Serre, J.-P.: A course in arithmetic. Graduate Texts in Math. 7. New York, Heidelberg, Berlin: Springer 1973
[Sm] Smale, S.: An infinite dimensional version of Sard’s theorem. Amer. J. Math. 87, 861–866 (1968)
[T] Taubes, C.H.: Self-dual connections on 4-manifolds with indefinite intersection matrix. J. Diff. Geom. 19, 517–560 (1984)
[Ue] Ue, M.: On the diffeomorphism types of elliptic surfaces with multiple fibers. Invent. math. 84, 633–643 (1986)
[U1] Uhlenbeck, K.K.: Removable singularities in Yang-Mills fields. Commun. Math. Phys. 83, 11–30 (1982)
[U2] Uhlenbeck, K.K.: Connections with L P bounds on curvature. Commun. Math. Phys. 83, 31–42 (1982)
[UY] Uhlenbeck, K.K., Yau, S.-T.: On the existence of Hermitian-Yang-Mills connections in stable vector bundles. Commun. Pure Appl. Math. 39, 257–293 (1986)
[We] Wehler, J.: Moduli space and versal deformation of stable vector bundles. Rev. Roumaine Math. Pures Appl. 30, 69–78 (1985)
[Y] Yau, S.T.: Calabi’s conjecture and some new results in algebraic geometry. Proc. Nat. Acad. Sci. USA 74, 1789–1799 (1977)
[Z] Zuo, K.: Generic smoothness of the moduli of rank two stable bundles over an algebraic surface. Preprint 7, MPI Bonn, 1990
Author information
Authors and Affiliations
Editor information
Rights and permissions
Copyright information
© 1991 Springer-Verlag
About this paper
Cite this paper
Okonek, C. (1991). Instanton invariants and algebraic surfaces. In: de Bartolomeis, P., Tricerri, F. (eds) Geometric Topology: Recent Developments. Lecture Notes in Mathematics, vol 1504. Springer, Berlin, Heidelberg. https://doi.org/10.1007/BFb0094290
Download citation
DOI: https://doi.org/10.1007/BFb0094290
Published:
Publisher Name: Springer, Berlin, Heidelberg
Print ISBN: 978-3-540-55017-4
Online ISBN: 978-3-540-46651-2
eBook Packages: Springer Book Archive