Nonnegative Biquadratic Tensors
Abstract
An M-eigenvalue of a nonnegative biquadratic tensor is referred to as an M+-eigenvalue if it has a pair of nonnegative M-eigenvectors. If furthermore that pair of M-eigenvectors is positive, then that M+-eigenvalue is called an M++-eigenvalue. A nonnegative biquadratic tensor has at least one M+ eigenvalue, and the largest M+-eigenvalue is both the largest M-eigenvalue and the M-spectral radius. For irreducible nonnegative biquadratic tensors, all the M+-eigenvalues are M++-eigenvalues. Although the M+-eigenvalues of irreducible nonnegative biquadratic tensors are not unique in general, we establish a sufficient condition to ensure their uniqueness. For an irreducible nonnegative biquadratic tensor, the largest M+-eigenvalue has a max-min characterization, while the smallest M+-eigenvalue has a min-max characterization. A Collatz algorithm for computing the largest M+-eigenvalues is proposed. Numerical results are reported.
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