On the α-spectral radius of uniform hypergraphs
Abstract
For 0α<1 and a uniform hypergraph G, the α-spectral radius of G is the largest H-eigenvalue of α D(G) +(1-α)A(G), where D(G) and A(G) are the diagonal tensor of degrees and the adjacency tensor of G, respectively. We give upper bounds for the α-spectral radius of a uniform hypergraph, propose some transformations that increase the α-spectral radius, and determine the unique hypergraphs with maximum α-spectral radius in some classes of uniform hypergraphs.
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