par Pioline, Boris;Persson, Daniel 
Référence Communications in Number Theory and Physics, 3, 4, page (697-754)
Publication Publié, 2009-12
Référence Communications in Number Theory and Physics, 3, 4, page (697-754)
Publication Publié, 2009-12
Article révisé par les pairs
| Résumé : | Understanding the implications of SL(2,ℤ) S-duality for the hypermultiplet moduli space of type II string theories has led to much progress recently in uncovering D-instanton contributions. In this work, we suggest that the extended duality group SL(3,ℤ), which includes both S-duality and Ehlers symmetry, may determine the contributions of D5 and NS5-branes. We support this claim by automorphizing the perturbative corrections to the "extended universal hypermultiplet," a five-dimensional universal SO(3)SL(3,ℝ) subspace which includes the string coupling, overall volume, Ramond zero-form and six-form and NS axion. Using the non-Abelian Fourier expansion of the Eisenstein series attached to the principal series of SL(3,R), worked out many years ago by Vinogradov, Takhtajan and Bump, we extract the contributions of D(-1)-D5 and NS5-brane instantons, corresponding to the Abelian and non-Abelian coefficients, respectively. In particular, the contributions of k NS5-branes can be summarized into a vector of wave functions Ψ k,ℓ, ℓ = 0, ... , k - 1, as expected on general grounds. We also point out that for more general models with a symmetric moduli space KG, the minimal theta series of G generates an infinite series of exponential corrections of the form required for "small" D(-1)-D1-D3-D5-NS5 instanton bound states. As a mathematical spin-off, we make contact with earlier results in the literature about the spherical vectors for the principal series of SL(3,ℝ) and for minimal representations. |
