Compactness results for linearly perturbed Yamabe problem on manifolds with boundary

Let (M,g) a compact Riemannian n-dimensional manifold. It is well know that, under certain hypothesis, in the conformal class of g there are scalar-flat metrics that have the boundary of M as a constant mean curvature hypersurface. Also, under certain hypothesis, it is known that these metrics are a compact set. In this paper we prove that, both in the case of umbilic and non-umbilic boundary, if we linearly perturb the mean curvature term hg with a negative smooth function, the set of solutions of Yamabe problem is still a compact set