The (signless Laplacian) spectral radius (of subgraphs) of uniform hypergraphs

Abstract: Let λ 1 (G) and q 1 (G) be the spectral radius and the signless Laplacian spectral radius of a kuniform hypergraph G, respectively. In this paper, we give the lower bounds of d − λ 1 (H) and 2d − q 1 (H), where H is a proper subgraph of a f (-edge)-connected d-regular (linear) k-uniform hypergraph. Meanwhile, we also give the lower bounds of 2∆ − q 1 (G) and ∆ − λ 1 (G), where G is a nonregular f (-edge)-connected (linear) k-uniform hypergraph with maximum degree ∆.

“…Liu et al [15] investigated the bounds of the principal ratio γ(H) = x max /x min and gave an estimate of the gap of spectral radii between H and its proper sub-hypergraph H . Many scholars also started to investigate the signless Laplacian spectral radius of m-uniform hypergraphs [7,14,25].…”

Some Properties of the Signless Laplacian and Normalized Laplacian Tensors of General Hypergraphs

“…Liu et al [15] investigated the bounds of the principal ratio γ(H) = x max /x min and gave an estimate of the gap of spectral radii between H and its proper sub-hypergraph H . Many scholars also started to investigate the signless Laplacian spectral radius of m-uniform hypergraphs [7,14,25].…”

Some Properties of the Signless Laplacian and Normalized Laplacian Tensors of General Hypergraphs

“…Recently, spectral hypergraph theory develops rapidly. There are many work about the spectral theory of hypergraphs [4,5,6,14,21,22]. However, there are still few studies the relation bewteen the clique number and the (signless Laplacian) spectral radius of hypergraphs.…”

The bounds of the spectral radius of general hypergraphs in terms of clique number

Largest signless Laplacian spectral radius of uniform supertrees with diameter and pendent edges (vertices)