Entire holomorphic curves into projective plane intersecting few generic algebraic curves

Abstract

For q≤ 3 smooth plane algebraic curves Ci having simple normal crossings, if the invariant logarithmic 2-jet differential bundle associated to (P2(C), Σi=1q Ci) has a nonzero section vanishing on some ample divisor, then, for every algebraically nondegenerate entire holomorphic curve f→P2(C), we have a Second Main Theorem type estimate: \[ Tf(r) ≤ cΣi=1q\,Nf[1](r,Ci) + o(Tf(r) ), \] where Tf(r) and Nf[1](r,Ci) stand for the order function and the 1--truncated counting functions in the Nevanlinna theory, and where the constant c=c(q,di)>0 can be computed explicitly. In particular, our result includes the case of 3 conics in P2(C). Moreover, we provide some new results concerning the algebraic degeneracy of certain complex surfaces, e.g., the complex hyperbolicity of a very generic surface of degree ≥ 15 in P3(C).