English

Two conjectures in spectral hypergraph theory

Combinatorics 2026-01-09 v1

Abstract

Let A\mathcal{A} be a kk-th order nn-dimensional tensor, and we denote by am(λ,A){\rm am}(\lambda, \mathcal{A}) the algebraic multiplicity of the eigenvalue λ\lambda of A\mathcal{A}. The projective eigenvariety Vλ(A)\mathbb{V}_\lambda(\mathcal{A}) is defined as the set of eigenvectors of A\mathcal{A} associated with λ\lambda, considered in the complex projective space. For a connected uniform hypergraph HH, let A(H)\mathcal{A}(H) and L(H)\mathcal{L}(H) denote its adjacency tensor and Laplacian tensor, respectively. Let ρ\rho be the spectral radius of A(H)\mathcal{A}(H), for which it is known that Vρ(A(H))=V0(L(H))|\mathbb{V}_{\rho}(\mathcal{A}(H))| = |\mathbb{V}_{0}(\mathcal{L}(H))|. Recently, Fan [arXiv:2410.20830v2, 2024] conjectured that am(ρ,A(H))=Vρ(A(H)){\rm am}(\rho, \mathcal{A}(H)) = |\mathbb{V}_{\rho}(\mathcal{A}(H))| and am(0,L(H))=am(ρ,A(H)){\rm am}(0, \mathcal{L}(H)) = {\rm am}(\rho, \mathcal{A}(H)). In this paper, we prove these two conjectures, and thereby establish am(ρ,A(H))=Vρ(A(H))=V0(L(H))=am(0,L(H)). {\rm am}(\rho, \mathcal{A}(H)) = |\mathbb{V}_{\rho}(\mathcal{A}(H))| = |\mathbb{V}_{0}(\mathcal{L}(H))| = {\rm am}(0, \mathcal{L}(H)). As shown by Fan et al., Vρ(A(H))|\mathbb{V}_{\rho}(\mathcal{A}(H))| and V0(L(H))|\mathbb{V}_{0}(\mathcal{L}(H))| can be computed via the Smith normal form of the incidence matrix of HH over Zk\mathbb{Z}_{k}. Consequently, we provide a method for computing the algebraic multiplicity of the spectral radius and zero Laplacian eigenvalue for connected uniform hypergraphs.

Keywords

Cite

@article{arxiv.2601.04514,
  title  = {Two conjectures in spectral hypergraph theory},
  author = {Ya-Nan Zheng},
  journal= {arXiv preprint arXiv:2601.04514},
  year   = {2026}
}
R2 v1 2026-07-01T08:55:24.873Z