Mirror manifolds in higher dimension

Dec, 1993
47 pages
Part of Mirror symmetry II, 745-791
Published in:
  • Commun.Math.Phys. 173 (1995) 559-598,
  • AMS/IP Stud.Adv.Math. 1 (1996) 745-791
e-Print:
Report number:
  • CLNS-93-1253,
  • IASSNS-HEP-94-2,
  • YCTP-P31-92

Citations per year

199420022010201820240246810
Abstract: (arXiv)
We describe mirror manifolds in dimensions different from the familiar case of complex threefolds. We emphasize the simplifying features of dimension three and supply more robust methods that do not rely on such special characteristics and hence naturally generalize to other dimensions. The moduli spaces for Calabi--Yau dd-folds are somewhat different from the ``special K\"ahler manifolds'' which had occurred for d=3d=3, and we indicate the new geometrical structures which arise. We formulate and apply procedures which allow for the construction of mirror maps and the calculation of order-by-order instanton corrections to Yukawa couplings. Mathematically, these corrections are expected to correspond to calculating Chern classes of various parameter spaces (Hilbert schemes) for rational curves on Calabi--Yau manifolds. Our results agree with those obtained by more traditional mathematical methods in the limited number of cases for which the latter analysis can be carried out. Finally, we make explicit some striking relations between instanton corrections for various Yukawa couplings, derived from the associativity of the operator product algebra.
  • space-time: Calabi-Yau
  • differential geometry
  • topology
  • coupling: Yukawa
  • Yukawa: coupling