English

From Quantum Monodromy to Duality

High Energy Physics - Theory 2009-10-28 v2

Abstract

For N ⁣= ⁣2N\!=\!2 SUSY theories with non-vanishing β\beta-function and one-dimensional quantum moduli, we study the representation on the special coordinates of the group of motions on the quantum moduli defined by ΓW ⁣= ⁣Sl(2;Z) ⁣/ ⁣ΓM\Gamma_W\!=\!Sl(2;Z)\!/\!\Gamma_M, with ΓM\Gamma_M the quantum monodromy group. ΓW\Gamma_W contains both the global symmetries and the strong-weak coupling duality. The action of ΓW\Gamma_W on the special coordinates is not part of the symplectic group Sl(2;Z)Sl(2;Z). After coupling to gravity, namely in the context of non-rigid special geometry, we can define the action of ΓW\Gamma_W as part of Sp(4;Z)Sp(4;Z). To do this requires singular gauge transformations on the "scalar" component of the graviphoton field. In terms of these singular gauge transformations the topological obstruction to strong-weak duality can be interpreted as a σ\sigma-model anomaly, indicating the possible dynamical role of the dilaton field in SS-duality.

Keywords

Cite

@article{arxiv.hep-th/9505135,
  title  = {From Quantum Monodromy to Duality},
  author = {C. Gomez and E. Lopez},
  journal= {arXiv preprint arXiv:hep-th/9505135},
  year   = {2009}
}

Comments

13 pages, Latex, misprints corrected