Add to ORKGIf G is a finite group and X a conjugacy class of elements of G, then we define rank (G : X) to be the minimum number of elements of X generating G. In the present paper we study the rank(Ji : X) for all conjugacy classes of Ji, where i = 1, 2, 3, 4.Keywords: Janko groups, rank, simple groups, sporadic groupsQuaestiones Mathematicae 31(2008), 37–4
A group \(G\) is said to be an \(FC\)-\(group\) if each element of \(G\) has only finitely many conj...
A group \(G\) is said to be an \(FC\)-\(group\) if each element of \(G\) has only finitely many conj...
A group \(G\) is said to be an \(FC\)-\(group\) if each element of \(G\) has only finitely many conj...
If G is a finite group and X a conjugacy class of G, then we define rank(G: X) to be the minimum num...
AbstractLet G be a finite group and X a conjugacy class of G. We denote rank(G:X) to be the minimum ...
Let G be a finite group and X a conjugacy class of G. We de-note rank(G: X) to be the minimum number...
Let G be a finite group and X a conjugacy class of G. We denote rank(G:X) to be the minimum number o...
Let G be a finite group and X a conjugacy class of G. We denote rank(G:X) to be the minimum number o...
If G is a finite group and X a conjugacy class of elements of G, then we define rank(G:X) to be the ...
Let G be a finite group and X a conjugacy class of G. We denote rank(G:X) to be the minimum number o...
If $G$ is a finite group and $X$ a conjugacy class of elements of $G$, then we define $rank(G{:}...
AbstractLet G be a finite group and X a conjugacy class of G. We denote rank(G:X) to be the minimum ...
In this paper, we consider all the Janko sporadic groups J1, J2, J3 and J4 (with orders 175560, 6048...
The main results of this paper provide a lower bound on the -rank of the finite -groups
Let G be a finite solvable group. We assume that the set of conjugacy class sizes of G is {1, m, n, ...
A group \(G\) is said to be an \(FC\)-\(group\) if each element of \(G\) has only finitely many conj...
A group \(G\) is said to be an \(FC\)-\(group\) if each element of \(G\) has only finitely many conj...
A group \(G\) is said to be an \(FC\)-\(group\) if each element of \(G\) has only finitely many conj...
If G is a finite group and X a conjugacy class of G, then we define rank(G: X) to be the minimum num...
AbstractLet G be a finite group and X a conjugacy class of G. We denote rank(G:X) to be the minimum ...
Let G be a finite group and X a conjugacy class of G. We de-note rank(G: X) to be the minimum number...
Let G be a finite group and X a conjugacy class of G. We denote rank(G:X) to be the minimum number o...
Let G be a finite group and X a conjugacy class of G. We denote rank(G:X) to be the minimum number o...
If G is a finite group and X a conjugacy class of elements of G, then we define rank(G:X) to be the ...
Let G be a finite group and X a conjugacy class of G. We denote rank(G:X) to be the minimum number o...
If $G$ is a finite group and $X$ a conjugacy class of elements of $G$, then we define $rank(G{:}...
AbstractLet G be a finite group and X a conjugacy class of G. We denote rank(G:X) to be the minimum ...
In this paper, we consider all the Janko sporadic groups J1, J2, J3 and J4 (with orders 175560, 6048...
The main results of this paper provide a lower bound on the -rank of the finite -groups
Let G be a finite solvable group. We assume that the set of conjugacy class sizes of G is {1, m, n, ...
A group \(G\) is said to be an \(FC\)-\(group\) if each element of \(G\) has only finitely many conj...
A group \(G\) is said to be an \(FC\)-\(group\) if each element of \(G\) has only finitely many conj...
A group \(G\) is said to be an \(FC\)-\(group\) if each element of \(G\) has only finitely many conj...