Poincare problem for divisors invariant by one-dimensional foliations on smooth algebraic variety

Abstract

In this paper we consider the question of bounding the degree of an divisor D invariant by a holomorphic foliation, without rational first integral, on smooth algebraic variety X in terms of degree of and some invariants of D and X. Particularly, if is a foliation of degree d on PC2, whose the number of invariants curves is greater that k+2 k, we show that there exist a number M(d,k) such that if k>M(d,k), then admits a rational first integral of degree ≤ k. Moreover, there exist a number G(d,k), such that if has an algebraic solution of degree k and genus smaller than G(d,k), then it has a rational first integral of degree ≤ k.