Affine hyperplane arrangements at finite distance

We study the relative homology group of an affine hyperplane arrangement and its Poincaré dual, the cohomology at finite distance of the complement. We give an Orlik–Solomon-type description of the latter, and identify it with the vector space of logarithmic forms having vanishing residues at infinity. To this end, we introduce a partial version of wonderful compactifications, which could be relevant in other contexts where blow-ups only occur at infinity. Finally, we show that the cohomology at finite distance coincides with the vector space of canonical forms in the sense of positive geometry.

💡 Research Summary

The paper introduces a new cohomological invariant for affine hyperplane arrangements, called the “cohomology at finite distance”. For an essential affine arrangement A⊂ℂⁿ, the authors define \