What does this research mean for the field?

Universal (U-) eigenvalues and eigenvectors of hypermatrices satisfy the Kronecker product property, preserve eigenvalues under defined similarity, and obey the Cayley-Hamilton Theorem. Novelty: ClaimNovelty.NOVEL_FINDING. Consensus alignment: ConsensusAlignment.NEUTRAL.

What question did this study set out to answer?

This research aims to explore and establish three fundamental properties of universal eigenvalues and eigenvectors of hypermatrices.

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April 25, 2026

Properties of Eigenvalue/Eigenvector of Hypermatrices

Key Points

This research aims to explore and establish three fundamental properties of universal eigenvalues and eigenvectors of hypermatrices.
Proved properties of eigenvalues/eigenvectors from hypermatrices including the Kronecker product.
Defined similarity of hypermatrices and its impact on eigenvalues/eigenvectors.
Examined the Cayley–Hamilton theorem as it applies to hypermatrices.
Proved that the eigenvalue/eigenvector of the Kronecker product is derived from the product of the corresponding factor hypermatrices.
Established that similarity in hypermatrices guarantees identical eigenvalues and eigenvectors.
Detailed the Cayley–Hamilton theorem specifically for hypermatrices.

Abstract

Three properties of the universal (U-) eigenvalues/eigenvectors of hypermatrices are proposed and proved. (1) The eigenvalue/eigenvector of Kronecker product of hypermatrices is the product of eigenvalues/eigenvectors of factor hypermatrices. (2) The similarity of hypermatrices is defined, and then it is proved that the similarity ensures the same eigenvalues/eigenvectors. (3) The Cayley–Hamilton Theorems of Hypermatrix. These properties justify the reasonability of U-engenvalues/eigenvectors.

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Properties of Eigenvalue/Eigenvector of Hypermatrices

Key Points

Abstract

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