English

Computing Invariant Spaces via Global Cluster Analysis and Representation Theory

Algebraic Topology 2025-08-08 v1 Rings and Algebras Representation Theory

Abstract

The Singer algebraic transfer is a fundamental homomorphism in algebraic topology, providing a bridge between the homology of classifying spaces and the cohomology of the Steenrod algebra A\mathcal{A}, which forms the E2E_2-term of the Adams spectral sequence. The domain of its dual is isomorphic to the space of GLk(F2)GL_k(\mathbb{F}_2)-invariants in the quotient of the polynomial algebra, (QPk)GLk(F2)(\mathcal{QP_k})^{GL_k(\mathbb{F}_2)}, where Pk\mathcal{P}_k is regarded as a module over A\mathcal{A}. A direct computation of this invariant space and its dual (i.e., the domain of the Singer transfer) remains a challenging problem. In this paper, we construct a new algorithm to compute (QPk)GLk(F2)(\mathcal{QP_k})^{GL_k(\mathbb{F}_2)}, which differs from the method presented in our recent work [15]. We refer to this new approach as the Global Cluster Analysis algorithm. It builds a \emph{weight interaction graph} to identify clusters of interacting weight spaces that form closed Σk\Sigma_k-submodules (where ΣkGLk(F2)\Sigma_k \subset GL_k(\mathbb{F}_2)). By performing invariance analysis on these larger clusters, our algorithm enables a complete and accurate computation of the global Σk\Sigma_k-invariants, which are then used to determine the final GLk(F2)GL_k(\mathbb F_2)-invariants. We also introduce an algorithm to directly compute the domain of the Singer transfer for ranks k3k \leq 3 in certain generic degrees, based entirely on Boardman's modular representation theory framework [2].

Keywords

Cite

@article{arxiv.2508.04959,
  title  = {Computing Invariant Spaces via Global Cluster Analysis and Representation Theory},
  author = {Dang Vo Phuc},
  journal= {arXiv preprint arXiv:2508.04959},
  year   = {2025}
}

Comments

21 pages

R2 v1 2026-07-01T04:38:17.471Z