Reconstructing inflation in scalar-torsion f(T,φ) gravity
Abstract
It is investigated the reconstruction during the slow-roll inflation in the most general class of scalar-torsion theories whose Lagrangian density is an arbitrary function f(T,φ) of the torsion scalar T of teleparallel gravity and the inflaton φ. For the class of theories with Lagrangian density f(T,φ)=-Mpl2 T/2 - G(T) F(φ) - V(φ), with G(T) Ts+1 and the power s as constant, we consider a reconstruction scheme for determining both the non-minimal coupling function F(φ) and the scalar potential V(φ) through the parametrization (or attractor) of the scalar spectral index ns(N) and the tensor-to-scalar ratio r(N) as functions of the number of e-folds N. As specific examples, we analyze the attractors ns-1 1/N and r 1/N, as well as the case r 1/N (N+γ) with γ a dimensionless constant. In this sense and depending on the attractors considered, we obtain different expressions for the function F(φ) and the potential V(φ), as also the constraints on the parameters present in our model and its reconstruction.
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