Ariyanti, Gregoria and Sari, Ana Easti Rahayu Maya (2023) The Discrete Lyapunov Equation of The Orthogonal Matrix in Semiring. The Discrete Lyapunov Equation of The Orthogonal Matrix in Semiring, 16 (2). pp. 784790. ISSN 13075543
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Abstract
Semiring is an algebraic structure of (S,+,×). Similar to a ring, but without the condition that each element must have an inverse to the adding operation. The forms (S, +) and (S,×) are semigroups that satisfy the distributive law of multiplication and addition. In matrix theory, there is a term known as the Kronecker product. This operation transforms two matrices into a larger matrix containing all possible products of the entries in the two matrices. This Kronecker product has several properties often used to solve the complex problems of linear algebra and its applications. The Kronecker product is related to the Lyapunov equation of a linear system. Based on previous research in the Lyapunov equation in conventional linear algebra, this paper will describe the characteristics of the Lyapunov equation in a semiring linear system in terms of the Kronecker product.
Item Type:  Article 

Uncontrolled Keywords:  Linear system, the Lyapunov equation, semiring, the Kronecker product 
Subjects:  Widya Mandala Catholic University on Madiun Campus > Faculty of Teacher Training and Education > Mathematics Education Study Program 
Divisions:  Journal Publication 
Depositing User:  F.X. Hadi 
Date Deposited:  05 Jul 2023 05:48 
Last Modified:  01 Aug 2023 06:41 
URI:  https://repository.ukwms.ac.id/id/eprint/35458 
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