The multiplicity of eigenvalues of nonnegative weakly irreducible tensors and uniform hypergraphs
Abstract
Hu and Ye conjectured that for a k-th order and n-dimensional tensor A with an eigenvalue λ and the corresponding eigenvariety Vλ(A), am(λ) Σi=1 dim(Vi)(k-1)dim(Vi)-1, where am(λ) is the algebraic multiplicity of λ, and V1,…,V are all irreducible components of Vλ(A). In this paper, we prove that if A is a nonnegative weakly irreducible tensor with spectral radius , then am(λ) |Vλ(A)| for all eigenvalues λ of A with modulus , where Vλ(A) is the projective eigenvariety of A associated with λ. Consequently we confirm Hu-Ye's conjecture for the above eigenvalues λ of A and also the least H-eigenvalue of a weakly irreducible Z-tensor. We prove several equality cases in Hu-Ye's conjecture for the eigenvalues of the adjacency tensor or Laplacian tensor of uniform hypergraphs.
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