U-duality

In physics, U-duality (short for unified duality) ^[1] is a symmetry of string theory or M-theory combining S-duality and T-duality transformations. The term is most often met in the context of the "U-duality (symmetry) group" of M-theory as defined on a particular background space (topological manifold). This is the union of all the S-duality and T-duality available in that topology. The narrow meaning of the word "U-duality" is one of those dualities that can be classified neither as an S-duality, nor as a T-duality - a transformation that exchanges a large geometry of one theory with the strong coupling of another theory, for example.

The idea was introduced by Hull and Townsend ^[2] .

References

1. S. Mizoguchi, "On discrete U-duality in M-theory", 2000.
2. Hull, C.M.; Townsend, P.K. (1995-03-27). "Unity of superstring dualities". Nuclear Physics B. 438 (1–2): 109–137. arXiv: hep-th/9410167 . doi:10.1016/0550-3213(94)00559-W.