Hyperbolicity of adjoint linear series on varieties with positive tangent bundle
Abstract
Let X be a smooth projective variety of dimension n≥ 3, and let L be an ample line bundle on X. In this article, we study the algebraic hyperbolicity of a very general section of the adjoint linear series |KX+mL| when the tangent bundle TX of X has suitable positivity properties. As a consequence, we show that the linear system |KX+mL| is hyperbolic (or pseudo-hyperbolic) for m≥ 3n+1, for various classes of polarized pairs (X,L), thus providing new evidence of a conjecture that was proposed by the second and fourth authors. Moreover, when X is abelian, we show that the linear system |mL| is hyperbolic for m≥ n, and the same holds when m≥ n-1, if |L| has no base divisors. It turns out that these bounds for abelian varieties are sharp. We also prove analogous statements for Kummer varieties and certain classes of hyperelliptic varieties.
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