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Stable singularities in string theory

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Abstract

We study a topological obstruction of a very stringy nature concerned with deforming the target space of anN=2 non-linear σ-model. This target space has a singularity which may be smoothed away according to the conventional rules of geometry, but when one studies the associated conformal field theory one sees that such a deformation is not possible without a discontinuous change in some of the correlation functions. This obstruction appears to come from torsion in the homology of the target space (which is seen by deforming the theory by an irrelevant operator). We discuss the link between this phenomenon and orbifolds with discrete torsion as studied by Vafa and Witten.

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References

  1. Artin, M., Mumford, D.: Some Elementary Results of Unirational Varieties which are not Rational Proc. London Math. Soc.25, 75–95 (1972)

    Google Scholar 

  2. Aspinwall, P.S.: The Moduli Space ofN=2 Superconformal Field Theories. Cornell 1994 preprint CLNS-94/1307, hep-th/9412115, to appear in the proceedings of the Trieste Summer School 1994

  3. Aspinwall, P.S.: Resolution of Orbifold Singularities in String Theory. IAS 1994 preprint IASSNS-HEP-94/9, hep-th/9403123, to appear in “Essays on Mirror Manifolds 2”

  4. Aspinwall, P.S., Greene, B.R.: On the Geometric Interpretation ofN=2 Superconformal Theories. Nucl. Phys.B437 (1995) 205–230

    Google Scholar 

  5. Aspinwall, P.S., Greene, B.R., Morrison, D.R.: The Monomial-Divisor Mirror Map. Internat. Math. Res. Notices1993, 319–338

  6. Aspinwall, P.S., Greene, B.R., Morrison, D.R.: Calabi-Yau Moduli Space, Mirror Manifolds and Spacetime Topology Change in String Theory. Nucl. Phys.B416, 414–480 (1994)

    Google Scholar 

  7. Aspinwall, P.S., Morrison, D.R.: Chiral Rings Do Not Suffice:N=(2,2) Theories with Nonzero Fundamental Group. Phys. Lett.334B, 79–86 (1994)

    Google Scholar 

  8. Batyrev, V.V.: Dual Polyhedra and Mirror Symmetry for Calabi-Yau Hypersurfaces in Toric Varieties. J. Alg. Geom.3, 493–535 (1994)

    Google Scholar 

  9. Bayer, D., Stillman, M.: Macaulay: A System for Computation in Algebraic Geometry and Commutative Algebra. Download from Zariski.harvard.edu

  10. Borisov, L.: Towards the Mirror Symmetry for Calabi-Yau Complete Intersections in Gorenstein Toric Fano Varieties. Michigan 1993 preprint, alg-geom/9310001

  11. Bott, R., Tu, L.W.: Differential Forms in Algebraic Topology. Berlin, Heidelberg, New York: Springer 1982

    Google Scholar 

  12. Candelas, P., de la Ossa, X., Font, A., Katz, S., Morrison, D.R.: Mirror Symmetry for Two Parameter Models-I. Nucl. Phys.B416, 481–562 (1994)

    Google Scholar 

  13. Candelas, P., de la Ossa, X.C., Green, P.S., Parkes, L.: A Pair of Calabi-Yau Manifolds as an Exactly Soluble Superconformal Theory. Nucl. Phys.B359, 21–74 (1991)

    Google Scholar 

  14. Candelas, P., Green, P., Hübsch, T.: Rolling Among Calabi-Yau Vacua. Nucl. Phys.B330, 49–102 (1990)

    Google Scholar 

  15. Cecotti, S., Vafa, C.: Exact Results for Supersymmetric σ Models. Phys. Rev. Lett.68, 903–906 (1992)

    Google Scholar 

  16. Clemens, H.: Double Solids. Advances in Math.47, 107–230 (1983)

    Google Scholar 

  17. D'Adda, A., Di Vecchia, P., Lüscher, M.: Confinement and Chiral Symmetry Breaking inCP n Models with Quarks. Nucl. Phys.B152, 125–144 (1979)

    Google Scholar 

  18. Dixon, L., Harvey, J.A., Vafa, C., Witten, E.: Strings on Orbifolds. Nucl. Phys.B 261, 678–686 (1985) andB274, 285–314 (1986)

    Google Scholar 

  19. Dolgachev, I., Gross, M.: Elliptic Threefolds I: Ogg-Shafarevich Theory. J. Alg. Geom.3 39–80 (1994)

    Google Scholar 

  20. Green, M., Schwarz, J., Witten, E.: Superstring Theory. Cambridge: Cambridge University Press, 1987, 2 volumes

    Google Scholar 

  21. Grothendieck, A.: Le Groupe de Brauer, I, II, III, In: Dix Exposés sur la Cohomologie des Schémas. Amsterdam: North Holland, 1968, pp. 46–188

    Google Scholar 

  22. Harris, J., Tu, L.: On Symmetric and Skew-symmetric Determinantal Varieties. Topology23, 71–84 (1984)

    Google Scholar 

  23. Milne, J.: Étale Cohomology. Princeton University Press, 1980

  24. Morrison, D.R., Plesser, M.R.: Summing the Instantons: Quantum Cohomology and Mirror Symmetry in Toric Varieties. Duke and IAS 1994 preprint DUKE-TH-94-78, IASSNS-HEP-94/82, hep-th/9412236, to appear in Nucl. Phys. B

  25. Strominger, A., Witten, E.: New Manifolds for Superstring Compactification, Commun. Math. Phys.101, 341–361 (1985)

    Google Scholar 

  26. Vafa C.: Modular Invariance and Discrete Torsion on Orbifolds. Nucl. Phys.B273, 592–606 (1986)

    Google Scholar 

  27. Vafa, C., Warner, N.: Catastrophes and the Classification of Conformal Theories. Phys. Lett218B, 51–58 (1989)

    Google Scholar 

  28. Vafa, C., Witten, E.: On Orbifolds with Discrete Torsion. J. Geom. Phys.15, 189–214 (1995)

    Google Scholar 

  29. Witten, E.: On the Structure of the Topological Phase of Two Dimensional Gravity, Nucl. Phys.B340, 281–332 (1990)

    Google Scholar 

  30. Witten, E.: Mirror Manifolds and Topological Field Theory. In: S.-T. Yau (ed.) Essays on Mirror Manifolds. Hong Kong International Press, 1992

  31. Witten, E.: Phases ofN=2 Theories in Two Dimensions. Nucl. Phys.B403, 159–222 (1993)

    Google Scholar 

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Authors and Affiliations

  1. F.R. Newman Lab. of Nuclear Studies, Cornell University, 14853, Ithaca, NY, USA

    Paul S. Aspinwall

  2. Department of Mathematics, Duke University, Box 90320, 27708, Durham, NC, USA

    David R. Morrison

  3. Department of Mathematics, Cornell University, 14853, Ithaca, NY, USA

    Mark Gross

Authors
  1. Paul S. Aspinwall
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  2. David R. Morrison
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  3. Mark Gross
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Additional information

Communicated by S.-T. Yau

Supported in part by NSF grant DMS-9400873.

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Aspinwall, P.S., Morrison, D.R. & Gross, M. Stable singularities in string theory. Commun.Math. Phys. 178, 115–134 (1996). https://doi.org/10.1007/BF02104911

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