AbstractEach ordering for the elements of a finite group G of order n defines a corresponding class of group matrices for G. First, this paper proves that the number of distinct classes of group matrices for G equals (n − 1)!/m, where m is the number of automorphisms of G. Then, a study is made of a block-diagonal reduction for the group matrices of any particular class
Let G be a finite group. The function ω()={() : ∈} assigns to G the set of orders of all elements...
We present a method for computing the table of marks of a direct product of finite groups. In contra...
Let G be a finite group of order n 65 2, (cursive Greek chi1,...,cursive Greek chin) an n-tuple of ...
AbstractWe develop a general formula for the order of the group of automorphisms Aut(G) of a monolit...
An isomorphism between the group ring of a finite group and a ring of certain block diagonal matrice...
AbstractLet F=GF(q) denote the finite field of order q, and Fmn the ring of m×n matrices over F. Let...
AbstractLet GL(n, q) denote the group of invertible n × n matrices over the finite field with q elem...
The book describes developments on some well-known problems regarding the relationship between order...
AbstractIn this paper, we study the resultants of polynomials which are the determinants of polynomi...
AbstractWe develop a general formula for the order of the group of automorphisms Aut(G) of a monolit...
Let G be a finite group. The function ω()={() : ∈} assigns to G the set of orders of all elements...
Let G be a finite group. The function ω()={() : ∈} assigns to G the set of orders of all elements...
Let G be a finite group. The function ω()={() : ∈} assigns to G the set of orders of all elements...
Let G be a finite group. The function ω()={() : ∈} assigns to G the set of orders of all elements...
Given a finite group G, we denote by ? \u27(G) the product of element orders of G. Our main result p...
Let G be a finite group. The function ω()={() : ∈} assigns to G the set of orders of all elements...
We present a method for computing the table of marks of a direct product of finite groups. In contra...
Let G be a finite group of order n 65 2, (cursive Greek chi1,...,cursive Greek chin) an n-tuple of ...
AbstractWe develop a general formula for the order of the group of automorphisms Aut(G) of a monolit...
An isomorphism between the group ring of a finite group and a ring of certain block diagonal matrice...
AbstractLet F=GF(q) denote the finite field of order q, and Fmn the ring of m×n matrices over F. Let...
AbstractLet GL(n, q) denote the group of invertible n × n matrices over the finite field with q elem...
The book describes developments on some well-known problems regarding the relationship between order...
AbstractIn this paper, we study the resultants of polynomials which are the determinants of polynomi...
AbstractWe develop a general formula for the order of the group of automorphisms Aut(G) of a monolit...
Let G be a finite group. The function ω()={() : ∈} assigns to G the set of orders of all elements...
Let G be a finite group. The function ω()={() : ∈} assigns to G the set of orders of all elements...
Let G be a finite group. The function ω()={() : ∈} assigns to G the set of orders of all elements...
Let G be a finite group. The function ω()={() : ∈} assigns to G the set of orders of all elements...
Given a finite group G, we denote by ? \u27(G) the product of element orders of G. Our main result p...
Let G be a finite group. The function ω()={() : ∈} assigns to G the set of orders of all elements...
We present a method for computing the table of marks of a direct product of finite groups. In contra...
Let G be a finite group of order n 65 2, (cursive Greek chi1,...,cursive Greek chin) an n-tuple of ...
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