Non-perturbative renormalization group for Higgs-like models in 4D (2504.09327v2)

Abstract: We recently defined a model of 2 coupled SU(2) Higgs-like doublets which revealed an interesting structure of renormalization group flows to 1-loop when the SU(2) is broken to U(1). In this article we compute the beta functions to 3 loops and show that the 1-loop structure of flows persists to higher orders. For SU(2) broken to U(1), we conjecture a beta function to all orders. The flows can be extended to large coupling using a strong-weak coupling duality $g \to 1/g$. One finds a line of fixed points which are new conformal field theories in 4 spacetime dimensions which are non-unitary due to negative norm states but still have real eigenvalues. We also find massless flows between 2 non-trivial fixed points, and a regime with a cyclic RG flow. For the flows between points on the critical line, we compute the anomalous dimensions of the perturbations in the UV and IR, and identify some special points where anomalous dimensions are rational numbers. The model is non-unitary since the hamiltonian is pseudo-hermitian, $H^\dagger = {\cal K} H {\cal K}^\dagger$. The unitary operator ${\cal K} $ satisfies $ {\cal K}^2 =1$ and this allows a projection onto positive norm states with a unitary time evolution with positive probabilities. We also provide some evidence for a hidden SL(2,Z) symmetry.