On the Largest Singular Value/Eigenvalue of a Random Tensor
Abstract
This short note presents upper bounds of the expectations of the largest singular values/eigenvalues of various types of random tensors in the non-asymptotic sense. For a standard Gaussian tensor of size n1×·s× nd, it is shown that the expectation of its largest singular value is upper bounded by n1+·s+ nd. For the expectation of the largest d-singular value, it is upper bounded by 2d-12Πj=1dnjd-22dΣdj=1nj12. We also derive the upper bounds of the expectations of the largest Z-/H-(d)/M-/C-eigenvalues of symmetric, partially symmetric, and piezoelectric-type Gaussian tensors, which are respectively upper bounded by d n, d· 2d-12nd-12, 2 m+2 n, and 3 n.
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