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Main Authors: Abe, Takuro, Kawanoue, Hiraku
Format: Preprint
Published: 2024
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Online Access:https://arxiv.org/abs/2406.00305
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author Abe, Takuro
Kawanoue, Hiraku
author_facet Abe, Takuro
Kawanoue, Hiraku
contents There are two restriction maps of the logarithmic modules of plane arrangements in a three dimensional vector space. One is the Euler restriction and the other is the Ziegler restriction. The dimension of the cokernel of the Ziegler restriction map of logarithmic derivation modules has been well-studied for the freeness of hyperplane arrangements after Yoshinaga's celebrated criterion for freeness, which connects the second Betti number and the splitting type (exponents). However, though the Euler restriction has a longer history than the Ziegler restriction, the cokernel and its dimension of the Euler restriction have not been studied at all. The aim of this article is to study the cokernel and dimension of the Euler restriction maps in terms of combinatorics, more explicitly, the characteristic polynomial. We give an upper bound of that cokernel, and show the formula for that if the arrangement is free.
format Preprint
id arxiv_https___arxiv_org_abs_2406_00305
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Cokernels of the Euler restriction map of logarithmic derivation modules
Abe, Takuro
Kawanoue, Hiraku
Combinatorics
Algebraic Geometry
32S22
There are two restriction maps of the logarithmic modules of plane arrangements in a three dimensional vector space. One is the Euler restriction and the other is the Ziegler restriction. The dimension of the cokernel of the Ziegler restriction map of logarithmic derivation modules has been well-studied for the freeness of hyperplane arrangements after Yoshinaga's celebrated criterion for freeness, which connects the second Betti number and the splitting type (exponents). However, though the Euler restriction has a longer history than the Ziegler restriction, the cokernel and its dimension of the Euler restriction have not been studied at all. The aim of this article is to study the cokernel and dimension of the Euler restriction maps in terms of combinatorics, more explicitly, the characteristic polynomial. We give an upper bound of that cokernel, and show the formula for that if the arrangement is free.
title Cokernels of the Euler restriction map of logarithmic derivation modules
topic Combinatorics
Algebraic Geometry
32S22
url https://arxiv.org/abs/2406.00305