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| Format: | Preprint |
| Published: |
2026
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| Subjects: | |
| Online Access: | https://arxiv.org/abs/2603.13984 |
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Table of Contents:
- The congruence subgroups $Γ_1(m,p)$ that we consider here are subgroups of $GL_m(\Z)$ that fix the vector $(0,\dots,0,1) \mod p$, where $p\geq 5$ is a prime. We present a method and many computations of homological Euler characteristics of $GL_m(\Z)$ and $Γ_1(m,p)$ with coefficients in any highest weight representation $V$. By homological Euler characteristics we mean the alternating dimensions of cohomology of the group with coefficient in $V$. We compute the homological Euler characteristics for $Γ_1(2,p)$, and $Γ_1(3,p)$ with coefficients in any finite dimensional highest weight representation. Also we compute the homological Euler characteristics for of $Γ_1(4,p)$ and $Γ_1(5,p)$ with coefficients in the trivial and the determinant representations. We give application to cohomology of $Γ_1(3,p)$ with trivial and with determinant representation. We also give an alternative method for computing the cohomology of $GL_4(\Z)$ compared to \cite{GL4}. The methods in this paper are a continuation of result from \cite{Thesis, EulerChar}.