GraviGUT unification with revisited Pati-Salam model
Abstract
We propose a graviGUT unification scheme based on the simple orthogonal group SO(1,9 ,C) that resolves the chiral duplication of weak isospin in Pati--Salam models. In the conventional SU(4)× SU(2)+× SU(2)- framework, the unobserved second chiral SU(2) is typically removed by ad hoc high-energy scale breaking. Here we instead geometrize it: one SU(2) factor is identified with a chiral half of the Lorentz group, so it belongs to gravity rather than to an additional weak force. This identification becomes natural inside SO(1,9 ,C), where the algebra decomposes as so(1,3)Cso(6)C(coset). We construct a parity-symmetric chiral action that, upon breaking dynamically selects one chirality: the surviving Yang--Mills factor is identified with SU(2)+, while the opposite chirality persists as the gravitational chiral connection. These lead to concrete phenomenological handles, including graviton and weak-boson vertices with the other fundamental forces in SU(3) and U(1) and parity-sensitive gravitational-wave signatures, that distinguish the SO(1,9,C) construction from both traditional Pati--Salam and larger, less economical unifications.
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