What question did this study set out to answer?

This study aims to explore the relationship between sums of Galois representations and their attachment to homology classes.

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December 11, 2025

Sums of Two Irreducible Galois Representations and the Homology of GL n (ℤ)

Key Points

This study aims to explore the relationship between sums of Galois representations and their attachment to homology classes.
Investigated irreducible Galois representations with their conductors
Examined Γ 0 (n,N)-orbits of flags of subspaces within ℚ n
Utilized a spectral sequence derived from the Tits building
Proved that direct sums of Galois representations are attached to Hecke eigenclasses in homology groups
Established conditions under which Galois representations retain specified weight, level, and nebentype in their direct sum
Derived two results concerning degrees of homology for irreducible Galois representations

Abstract

Given two irreducible Galois representations with relatively prime conductors, each attached to a Hecke eigenclass in an appropriate homology group, we prove that their direct sum is also attached to a Hecke eigenclass in a homology group, and that if the two Galois representations have weight, level, and nebentype predicted by a Serretype conjecture of the authors and David Pollack, then so does the direct sum. Our methods utilize a study of Γ 0 (n,N)-orbits of flags of subspaces of ℚ n , reducibility results for Galois representations attached to cohomology of parabolic subgroups of GL n , and a spectral sequence derived from the Tits building. In addition, we use the spectral sequence to prove two results about the degrees of homology to which irreducible Galois representations can be attached.

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