Miguel A. Barja scite author profile

We study three methods that prove the positivity of a natural numerical invariant associated to 1-parameter families of polarized varieties. All these methods involve different stability conditions. In dimension 2 we prove that there is a natural connection between them, related to a yet another stability condition, the linear stability. Finally we make some speculations and prove new results in higher dimension.

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Generalized Clifford–Severi inequality and the volume of irregular varieties

Barja¹

2015

Duke Math. J.

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We give a sharp lower bound for the self-intersection of a nef line bundle L on an irregular variety X in terms of its continuous global sections and the Albanese dimension of X, which we call the Generalized Clifford-Severi inequality. We also extend the result to nef vector bundles and give a slope inequality for fibred irregular varieties. As a byproduct we obtain a lower bound for the volume of irregular varieties; when X is of maximal Albanese dimension the bound is vol(X) ≥ 2 n! χ(ωX) and it is sharp.

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A note on a conjecture of Xiao

Barja¹,

Zucconi²

2000

J. Math. Soc. Japan

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On the topological index of irregular surfaces

2006

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Miguel A. Barja

Linear stability of projected canonical curves with applications to the slope of fibred surfaces

Stability Conditions and Positivity of Invariants of Fibrations

Generalized Clifford–Severi inequality and the volume of irregular varieties

A note on a conjecture of Xiao

On the topological index of irregular surfaces

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