Logarithmic spectral correspondence for V--twisted Higgs bundles on punctured curves

Abstract

Let X be a smooth projective complex curve, P⊂ X a reduced effective divisor, and X0=X P. We study logarithmic V-twisted Higgs bundles arising from a logarithmic Hecke compactification of a rank-two bundle on X0. We show that a pair of induced logarithmic line-twisted fields lifts uniquely exactly under explicit local Hecke conditions, and that the lift is integrable precisely when the fields commute. Fixing the compactified spectral curve Y, we classify such Higgs bundles by pairs (F,\,), where F is a rank-one torsion-free sheaf on Y and satisfies a marked spectral condition on a finite subscheme Z⊂ Y. This gives a logarithmic extension of the compact rank-two spectral correspondence of~ABK to the punctured case. On the line-bundle locus, the moduli stack is canonically equivalent to Picd(Y)× AZ.

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