General curves on algebraic surfaces
Abstract
We give upper bounds on the genus of a curve with general moduli assuming that it can be embedded in a projective nonsingular surface Y so that (|C|) > 0. We find such bounds for all types of surfaces of intermediate Kodaira dimension and, under mild restrictions, for surfaces of general type whose minimal model Z satisfies the Castelnuovo inequality KZ2 3(Z) - 10. In this last case we obtain g 19. In the other cases considered the bounds are lower.
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