T-Quadratic Forms and Spectral Analysis of T-Symmetric Tensors
An $n \times n \times p$ tensor is called a T-square tensor. It arises from many applications, such as the image feature extraction problem and the multi-view clustering problem. We may symmetrize a T-square tensor to a T-symmetric tensor. For each T-square tensor, we define a T-quadratic form, whose variable is an $n \times p$ matrix, and whose value is a $p$-dimensional vector. We define eigentuples and eigenmatrices for T-square tensors. We show that a T-symmetric tensor has unique largest and smallest eigentuples, and a T-quadratic form is positive semi-definite (definite) if and only if its smallest eigentuple is nonnegative (positive). The relation between the eigen-decomposition of T-symmetric tensors, and the TSVD of general third order tensors are also studied.
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