Sur la conjecture abc, version corps de fonctions d'Oesterle

Abstract

We show a weak form of the function field version of Oesterle's abc conjecture. It asserts that, if B is a complex projective connected curve, the number of intersection points, counted without multiplicities, of a fixed divisor D of degree d>0 over B with the graph H of a section h:B B× 1 to the first projection is at least (d-2)n-C(B,D), where n is the degree of H over 1, and C(D,B) a constant depending only on these two data. We show this number is at least (d-2[ d]).n-C(D,B). The constant is ineffective.

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