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        <dc:title>Algebraic Geometry of the Multilayer Model of the Fractional Quantum Hall Effect on a Torus</dc:title>
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        <bibo:abstract>&lt;jats:title&gt;Abstract&lt;/jats:title&gt;
          &lt;jats:p&gt;In 1993 Keski-Vakkuri and Wen introduced a model for the fractional quantum Hall effect based on multilayer two-dimensional electron systems satisfying quasi-periodic boundary conditions. Such a model is essentially specified by a choice of a complex torus &lt;jats:italic&gt;E&lt;/jats:italic&gt; and a symmetric positively definite matrix &lt;jats:italic&gt;K&lt;/jats:italic&gt; of size &lt;jats:italic&gt;g&lt;/jats:italic&gt; with non-negative integral coefficients, satisfying some further constraints. The space of the corresponding wave functions turns out to be &lt;jats:inline-formula&gt;
              &lt;jats:alternatives&gt;
                &lt;jats:tex-math&gt;$$\delta $$&lt;/jats:tex-math&gt;
                &lt;mml:math xmlns:mml=&quot;http://www.w3.org/1998/Math/MathML&quot;&gt;
                  &lt;mml:mi&gt;δ&lt;/mml:mi&gt;
                &lt;/mml:math&gt;
              &lt;/jats:alternatives&gt;
            &lt;/jats:inline-formula&gt;-dimensional, where &lt;jats:inline-formula&gt;
              &lt;jats:alternatives&gt;
                &lt;jats:tex-math&gt;$$\delta $$&lt;/jats:tex-math&gt;
                &lt;mml:math xmlns:mml=&quot;http://www.w3.org/1998/Math/MathML&quot;&gt;
                  &lt;mml:mi&gt;δ&lt;/mml:mi&gt;
                &lt;/mml:math&gt;
              &lt;/jats:alternatives&gt;
            &lt;/jats:inline-formula&gt; is the determinant of &lt;jats:italic&gt;K&lt;/jats:italic&gt;. We construct a hermitian holomorphic bundle of rank &lt;jats:inline-formula&gt;
              &lt;jats:alternatives&gt;
                &lt;jats:tex-math&gt;$$\delta $$&lt;/jats:tex-math&gt;
                &lt;mml:math xmlns:mml=&quot;http://www.w3.org/1998/Math/MathML&quot;&gt;
                  &lt;mml:mi&gt;δ&lt;/mml:mi&gt;
                &lt;/mml:math&gt;
              &lt;/jats:alternatives&gt;
            &lt;/jats:inline-formula&gt; on the abelian variety &lt;jats:italic&gt;A&lt;/jats:italic&gt; (which is the &lt;jats:italic&gt;g&lt;/jats:italic&gt;-fold product of the torus &lt;jats:italic&gt;E&lt;/jats:italic&gt; with itself), whose fibres can be identified with the space of wave function of Keski-Vakkuri and Wen. A rigorous construction of this “magnetic bundle” involves the technique of Fourier–Mukai transforms on abelian varieties. The constructed bundle turns out to be simple and semi-homogeneous and it can be equipped with two different (and natural) hermitian metrics: the one coming from the center-of-mass dynamics and the one coming from the Hilbert space of the underlying many-body system. We prove that the canonical Bott–Chern connection of the first hermitian metric is always projectively flat and give sufficient conditions for this property for the second hermitian metric.&lt;/jats:p&gt;</bibo:abstract>
        <bibo:volume>406</bibo:volume>
        <bibo:issue>5</bibo:issue>
        <dc:publisher>Springer Science and Business Media LLC</dc:publisher>
        <bibo:doi rdf:resource="10.1007/s00220-025-05267-9" />
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