Differential Equations on Complex Projective Hypersurfaces of Low Dimension
Abstract
Let n=2,3,4,5 and let X be a smooth complex projective hypersurface of Pn+1. In this paper we find an effective lower bound for the degree of X, such that every holomorphic entire curve in X must satisfy an algebraic differential equation of order k=n= X, and also similar bounds for order k>n. Moreover, for every integer n 2, we show that there are no such algebraic differential equations of order k<n for a smooth hypersurface in Pn+1.
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