On a reconstruction procedure for special spherically symmetric metrics in the scalar-Einstein-Gauss-Bonnet model: the Schwarzschild metric test

Abstract

The 4D gravitational model with a real scalar field , Einstein and Gauss-Bonnet terms is considered. The action contains the potential U() and the Gauss-Bonnet coupling function f(). For a special static spherically symmetric metric ds2 = (A(u))-1 du2 - A(u) dt2 + u2 d2, with A(u) > 0 (u > 0 is a radial coordinate), we verify the so-called reconstruction procedure suggested by Nojiri and Nashed. This procedure presents certain implicit relations for U() and f() which lead to exact solutions to the equations of motion for a given metric governed by A(u). We confirm that all relations in the approach of Nojiri and Nashed for f((u)) and (u) are correct, but the relation for U((u)) contains a typo which is eliminated in this paper. Here we apply the procedure to the (external) Schwarzschild metric with the gravitational radius 2 μ and u > 2 μ. Using the ``no-ghost'' restriction (i.e., reality of (u)), we find two families of (U(), f()). The first one gives us the Schwarzschild metric defined for u > 3 μ, while the second one describes the Schwarzschild metric defined for 2 μ < u < 3 μ (3 μ is the radius of the photon sphere). In both cases the potential U() is negative.