Hyperbolic surfaces in P3(C)

We show a class of perturbations X of the Fermat hypersurface such that any holomorphic curve from C info X is degenerate. Applying this result, we give explicit examples of hyperbolic surfaces in P-3(C) of arbitrary degree d greater than or equal to 22, and of curves of arbitrary degree d greater than or equal to 19 in P-2 (C) with hyperbolic complements.