Perron-Frobenius Theorem for Rectangular Tensors and Directed Hypergraphs

Abstract

For any positive integers r, s, m, n, an (r,s)-order (n,m)-dimensional rectangular tensor A=(ai1·s irj1·s js) ∈ ( Rn)r× ( Rm)s is called partially symmetric if it is invariant under any permutation on the lower r indexes and any permutation on the upper s indexes. Such partially symmetric rectangular tensor arises naturally in studying directed hypergraphs. Ling and Qi [Front. Math. China, 2013] first studied the (p,q)-spectral radius (or singular values) and proved a Perron-Fronbenius theorem for such tensors when both p,q ≥ r+s. We improved their results by extending to all (p,q) satisfying rp +sq≤ 1. We also proved the Perron-Fronbenius theorem for general nonnegative (r,s)-order (n,m)-dimensional rectangular tensors when rp+sq>1. We essentially showed that this is best possible without additional conditions on A. Finally, we applied these results to study the (p,q)-spectral radius of (r,s)-uniform directed hypergraphs.