| Abstrakt: |
It was shown by Diaconescu, Donagi, and Pantev that Hitchin systems of type ADE are isomorphic to certain Calabi–Yau integrable systems. In this paper, we prove an analogous result in the setting of meromorphic Hitchin systems of type A, which are known to be Poisson integrable systems. We consider a symplectization of the meromorphic Hitchin integrable system, which is a semi-polarized integrable system in the sense of Kontsevich and Soibelman. On the Hitchin side, we show that the moduli space of unordered diagonally framed Higgs bundles forms an integrable system in this sense and recovers the meromorphic Hitchin system as the fiberwise compact quotient. Then we construct a family of quasi-projective Calabi–Yau three-folds and show that its relative intermediate Jacobian fibration, as a semi-polarized integrable system, is isomorphic to the moduli space of unordered diagonally framed Higgs bundles. [ABSTRACT FROM AUTHOR] |
