Yun Miao scite author profile

In this paper, we present the definition of generalized tensor function according to the tensor singular value decomposition (T-SVD) based on the tensor T-product. Also, we introduce the compact singular value decomposition (T-CSVD) of tensors, from which the projection operators and Moore Penrose inverse of tensors are obtained. We establish the Cauchy integral formula for tensors by using the partial isometry tensors and applied it into the solution of tensor equations. Then we establish the generalized tensor power and the Taylor expansion of tensors. Explicit generalized tensor functions are listed. We define the tensor bilinear and sesquilinear forms and proposed theorems on structures preserved by generalized tensor functions. For complex tensors, we established an isomorphism between complex tensors and real tensors. In the last part of our paper, we find that the block circulant operator established an isomorphism between tensors and matrices. This isomorphism is used to prove the F-stochastic structure is invariant under generalized tensor functions. The concept of invariant tensor cones is raised.

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T-Jordan Canonical Form and T-Drazin Inverse Based on the T-Product

Miao

Wei

2020

Commun. Appl. Math. Comput.

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T-Jordan Canonical Form and T-Drazin Inverse based on the T-Product

Miao

Wei

2019

Preprint

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Fourth-order tensor Riccati equations with the Einstein product

Miao

Wei

Chen

2020

Linear and Multilinear Algebra

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Generalized Tensor Function via the Tensor Singular Value Decomposition based on the T-Product

Miao¹,

Qi²,

Wei³

2019

Preprint

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Yun Miao

Generalized tensor function via the tensor singular value decomposition based on the T-product

T-Jordan Canonical Form and T-Drazin Inverse Based on the T-Product

T-Jordan Canonical Form and T-Drazin Inverse based on the T-Product

Fourth-order tensor Riccati equations with the Einstein product

Generalized Tensor Function via the Tensor Singular Value Decomposition based on the T-Product

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