Journal of High Energy Physics (Apr 2024)
Sp(6, Z) modular symmetry in flavor structures: quark flavor models and Siegel modular forms for $$\widetilde{\Delta }\left(96\right)$$
Abstract
Abstract We study an approach to construct Siegel modular forms from Sp(6, Z). Zero-mode wave functions on T 6 with magnetic flux background behave Siegel modular forms at the origin. Then T-symmetries partially break depending on the form of background magnetic flux. We study the background such that three T-symmetries T I , T II and T III as well as the S-symmetry remain. Consequently, we obtain Siegel modular forms with three moduli parameters (ω 1, ω 2, ω 3), which are multiplets of finite modular groups. We show several examples. As one of examples, we study Siegel modular forms for $$\widetilde{\Delta }\left(96\right)$$ in detail. Then, as a phenomenological applicantion, we study quark flavor models using Siegel modular forms for $$\widetilde{\Delta }\left(96\right)$$ . Around the cusp, ω 1 = i∞, the Siegel modular forms have hierarchical values depending on their T I -charges. We show the deviation of ω 1 from the cusp can generate large quark mass hierarchies without fine-tuning. Furthermore CP violation is induced by deviation of ω 2 from imaginary axis.
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