Sp(4,Z) modular inflation

Abstract

We investigate inflation models governed by the Siegel modular group Sp(4,Z). The Sp(4,Z) group extends the SL(2,Z) framework from one modulus to three moduli while preserving the hyperbolic geometry of the K\"ahler potential, allowing for the construction of cosmological α-attractor models. In this context, we use genus g=2 absolute invariants to construct inflationary potentials within specific subspaces of the Siegel moduli space. These models are driven by the imaginary components of the moduli τ and naturally yield plateau-like potentials consistent with Planck 2018 observations in large field limit. We employ two-dimensional complex subspaces to realize E-model and T-model like two-field inflation scenarios. We explore the subspace of complex dimension one to construct a modified polynomial α-attractor model, which can accommodate the larger spectral index ns favored by recent ACT and SPT data, particularly in the larger N regime.

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