Modular forms and SL(2, ℤ)-covariance of type IIB superstring theory

• Main Authors: Michael B. Green, Congkao Wen
• Format: Article
• Language: English
• Published: SpringerOpen 2019-06-01
• Series: Journal of High Energy Physics
• Subjects: Scattering Amplitudes; String Duality; Supersymmetry and Duality
• Online Access: http://link.springer.com/article/10.1007/JHEP06(2019)087

Abstract The local higher-derivative interactions that enter into the low-energy expansion of the effective action of type IIB superstring theory with constant complex modulus generally violate the U(1) R-symmetry of IIB supergravity by q U units. These interactions have coefficients that transform as non-holomorphic modular forms under SL(2, ℤ) transformations with holomorphic and anti-holomorphic weights (w, −w), where q U = −2w. In this paper SL(2, ℤ)-covariance and supersymmetry are used to determine first-order differential equations on moduli space that relate the modular form coefficients of classes of BPS-protected maximal U(1)-violating interactions that arise at low orders in the lowenergy expansion. These are the moduli-dependent coefficients of BPS interactions of the form d 2p P $$ \mathcal{P} $$ n in linearised approximation, where P $$ \mathcal{P} $$ n is the product of n fields that has dimension = 8 with q U = 8 − 2n, and p = 0, 2 or 3. These first-order equations imply that the coefficients satisfy SL(2, ℤ)-covariant Laplace eigenvalue equations on moduli space with solutions that contain information concerning perturbative and non-perturbative contributions to superstring amplitudes. For p = 3 and n ≥ 6 there are two independent modular forms, one of which has a vanishing tree-level contribution. The analysis of super-amplitudes for U(1)-violating processes involving arbitrary numbers of external fluctuations of the complex modulus leads to a diagrammatic derivation of the first-order differential relations and Laplace equations satisfied by the coefficient modular forms. Combining this with a SL(2, ℤ)-covariant soft axio-dilaton limit that relates amplitudes with different values of n determines most of the modular invariant coefficients, leaving a single undetermined constant.