Eigenvectors of Z-tensors associated with least H-eigenvalue with application to hypergraphs

Abstract

Unlike an irreducible Z-matrices, a weakly irreducible Z-tensor A can have more than one eigenvector associated with the least H-eigenvalue. We show that there are finitely many eigenvectors of A associated with the least H-eigenvalue. If A is further combinatorial symmetric, the number of such eigenvectors can be obtained explicitly by the Smith normal form of the incidence matrix of A. When applying to a connected uniform hypergraph G, we prove that the number of Laplacian eigenvectors of G associated with the zero eigenvalue is equal to the the number of adjacency eigenvectors of G associated with the spectral radius, which is also equal to the number of signless Laplacian eigenvectors of G associated with the zero eigenvalue if zero is an signless Laplacian eigenvalue.