| Popis: |
The t-product of cubic matrices has been extended to a class of permutation-based t-product. Some algebraic structures for t-product have been demonstrated and extended to permutation-based t-products, including t-monoid, t-group, t-ring, t-module, t-general linear algebra, t-general linear group of cubic matrices. Their relationship with monoid, group, ring, general linear algebra and general linear group of matrices respectively are revealed via a universal homomorphism. As an application, the t-product based dynamic (control) systems over cubic matrices are also investigated. Finally, the t-semi-tensor product (t-STP), as the combination of t-product and STP of matrices, is presented, which provides a generalization of the t-based algebraic structure for cubic matrices of arbitrary dimensions. |
