An alternate computation of the stable homology of dihedral group   Hurwitz spaces

Aaron Landesman; Ishan Levy

arXiv:2410.22222·math.NT·October 30, 2024

An alternate computation of the stable homology of dihedral group Hurwitz spaces

Aaron Landesman, Ishan Levy

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TL;DR

This paper presents an elementary proof for computing the stable homology of dihedral group Hurwitz spaces, simplifying previous approaches that relied on advanced algebraic techniques.

Contribution

It introduces a more accessible proof method for the stable homology of dihedral group Hurwitz spaces, avoiding complex algebraic tools.

Findings

01

Elementary proof of stable homology computation

02

Simplification over previous algebraic methods

03

Potential for broader applicability in algebraic topology

Abstract

We give an different proof of our result computing the stable homology of dihedral group Hurwitz spaces. This proof employs more elementary methods, instead of higher algebra.

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Taxonomy

TopicsHomotopy and Cohomology in Algebraic Topology · Geometric and Algebraic Topology · Advanced Topics in Algebra