In this paper, for rings R, we introduce complex rings C(R), quaternion rings H(R), and octonion rings O(R), which are extension rings of R; R C(R) H(R) O(R). Our main purpose of this paper is to sho...In this paper, for rings R, we introduce complex rings C(R), quaternion rings H(R), and octonion rings O(R), which are extension rings of R; R C(R) H(R) O(R). Our main purpose of this paper is to show that if R is a Frobenius algebra, then these extension rings are Frobenius Mgebras and if R is a quasi-Frobenius ring, then C(R) and H(R) are quasi-Frobenius rings and, when Char(R)=2, O(R) is also a quasi-Frobenius ring.展开更多
A concept of [GRAPHICS] diagonalization matrix over quaternion field is given, the necessary and sufficient conditions for determining whether a quaternion matrix is a [GRAPHICS] diagonalization one are discussed, and...A concept of [GRAPHICS] diagonalization matrix over quaternion field is given, the necessary and sufficient conditions for determining whether a quaternion matrix is a [GRAPHICS] diagonalization one are discussed, and a method of [GRAPHICS] diagonalization of matrices over quaternion field is given.展开更多
文摘In this paper, for rings R, we introduce complex rings C(R), quaternion rings H(R), and octonion rings O(R), which are extension rings of R; R C(R) H(R) O(R). Our main purpose of this paper is to show that if R is a Frobenius algebra, then these extension rings are Frobenius Mgebras and if R is a quasi-Frobenius ring, then C(R) and H(R) are quasi-Frobenius rings and, when Char(R)=2, O(R) is also a quasi-Frobenius ring.
文摘A concept of [GRAPHICS] diagonalization matrix over quaternion field is given, the necessary and sufficient conditions for determining whether a quaternion matrix is a [GRAPHICS] diagonalization one are discussed, and a method of [GRAPHICS] diagonalization of matrices over quaternion field is given.
