Abstract
Higgs inflation and $R^2$-inflation (Starobinsky model) are two limits of the same quantum model, hereafter called Starobinsky-Higgs. We analyse the two-loop action of the Higgs-like scalar $\phi$ in the presence of: 1) non-minimal coupling ($\xi$) and 2) quadratic curvature terms. The latter are generated at the quantum level with $\phi$-dependent couplings ($\tilde\alpha$) even if their tree-level couplings ($\alpha$) are tuned to zero. Therefore, the potential always depends on both Higgs field $\phi$ and scalaron $\rho$, hence multi-field inflation is a quantum consequence. The effects of the quantum (one- and two-loop) corrections on the potential $\hat W(\phi,\rho)$ and on the spectral index are discussed, showing that the Starobinsky-Higgs model is in general stable in their presence. Two special cases are also considered: first, for a large $\xi$ in the quantum action one can integrate $\phi$ and generate a "refined" Starobinsky model which contains additional terms $\xi^2 R^2\ln^p (\xi \vert R\vert/\mu^2)$, $p=1,2$ ($\mu$ is the subtraction scale). These generate corrections linear in the scalaron to the "usual" Starobinsky potential and a "running" scalaron mass. Second, for a small fixed Higgs field $\phi^2 \ll M_p^2/\xi$ and a vanishing classical coefficient of the $R^2$-term, we show that the "usual" Starobinsky inflation is generated by the quantum corrections alone, for a suitable non-minimal coupling ($\xi$).
Highlights
The idea of inflation in the early universe [1,2,3,4,5,6,7,8] led to many models in agreement with the cosmic microwave background CMB [10]; of these, minimal models like Starobinsky model [2] and the Higgs inflation model [11,12,13] are among the most successful.In Higgs inflation, a nonminimal coupling ξφ2R of the Higgs φ to the Ricci scalar R is considered, with φ in the role of the inflaton
We show that even if there is no R2 term at the tree level (α 1⁄4 0), a term ðξ þ 1=6Þ2R2 ln φ emerges at the loop level
We find an interesting result: even if it is absent at the classical level, the “usual” Starobinsky inflation is generated at the quantum level, if there exists a suitable nonminimal coupling ξ of the Higgs field, see [30]
Summary
The idea of inflation in the early universe [1,2,3,4,5,6,7,8] (for a review [9]) led to many models in agreement with the cosmic microwave background CMB [10]; of these, minimal models like Starobinsky model [2] and the Higgs inflation model [11,12,13] are among the most successful (for more recent developments in Higgs inflation, see, e.g., [14,15,16,17,18,19,20,21,22,23,24,25] and in the R2 models [26,27,28,29,30,31,32,33,34,35,36,37,38]). In Starobinsky inflation an αR2 term (α constant) is added to the Einstein term, inducing geometrically a new scalar field ρ (scalaron) playing the role of inflaton Both models give a similar spectral index of primordial scalar adiabatic perturbations. We study the two-loop corrections to the effective action with nonminimal coupling ξ and quadratic curvature terms (R2, R2μν, R2μνρσ), following [25,40,41,42,43,44] (Sec. III). We show that even if there is no R2 term at the tree level (α 1⁄4 0), a term ðξ þ 1=6Þ2R2 ln φ emerges at the loop level This is an interesting result, since the mere presence of a fixed, small Higgs field φ ≪ Mp with large nonminimal coupling ξφ2R, provides a quantum origin to the “usual” Starobinsky model of inflation!
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