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    <rdf:Description rdf:about="https://ris.uni-paderborn.de/record/66309">
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        <dc:title>Semi-homogeneous vector bundles on abelian varieties: moduli spaces and their tropicalization</dc:title>
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        <bibo:abstract>Let $A$ be an abelian variety with totally degenerate reduction over a non-Archimedean field. We describe the moduli space of semihomogeneous vector bundles on $A$ from the perspective of non-Archimedean uniformization and show that the essential skeleton may be identified with a tropical analogue of this moduli space. For $H=0$ our moduli space may be identified with the moduli space $M_{0,r}(A)$ of semistable vector bundles with vanishing Chern classes on $A$. In this case we construct a surjective analytic morphism from the character variety of the analytic fundamental group of $A$ onto $M_{0,r}(A)$, which naturally tropicalizes. One may view this construction as a non-Archimedean uniformization of $M_{0,r}(A)$.</bibo:abstract>
        <bibo:doi rdf:resource="10.1017/S2949764726100228" />
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