Abstract
A (central) arrangement is a finite family of one-codimensional subspaces of a vector space $V$. We study the module of logarithmic forms with poles along the hyperplanes. We use a certain cochain complex and its cohomological groups to prove that cohomological properties of the module are closely related to the explicit structure of the module.
Citation
Ki-Suk LEE. "Homological Properties of the Module of Logarithmic Forms of Arrangements." Tokyo J. Math. 24 (1) 87 - 92, June 2001. https://doi.org/10.3836/tjm/1255958313
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