On the quadratic action of the Hawking-Turok instanton

Abstract

Positive definiteness of the quadratic part of the action of the Hawking-Turok instanton is investigated. The Euclidean quadratic action for scalar perturbations is expressed in terms of a single gauge invariant quantity q. The mode functions satisfy a Schr\"odinger type equation with a potential U. It is shown that the potential U tends to a positive constant at the regular end of the instanton. The detailed shape of U depends on the initial data of the instanton, on parameters of the background scalar field potential V and on a positive integer, p, labeling different spherical harmonics. For certain well behaved scalar field potentials it is proven analytically that for p>1 quadratic action is non-negative. For the lowest p=1 (homogeneous) harmonic numerical solution of the Schr\"odinger equation for different scalar field potentials V and different initial data show that in some cases the potential U is negative in the intermediate region. We investigated the monotonously growing potentials and a potential with a false vacuum. For the monotonous potentials no negative modes are found about the Hawking-Turok instanton. For a potential with the false vacuum the HT instanton is shown to have a negative mode for certain initial data.

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