Add to ORKGWe examine (finitely generated) profinite groups in which two formal Dirichlet series, the normal subgroup zeta function and the normal probabilistic zeta function, coincide; we call these groups normally ζ-reversible. We conjecture that these groups are pronilpotent and we prove this conjecture if G is a normally ζ-reversible satisfying one of the following properties: G is prosoluble, G is perfect, all the nonabelian composition factors of G are alternating groups
We discuss finiteness properties of a profinite group G whose probabilistic zeta function P(G,s) is ...
summary:This article is dedicated to soluble groups, in which pronormality is a transitive relation....
A group G is invariably generated by a subset S of G if G = \u3008sg(s) | s 08 S\u3009 for each cho...
We examine (finitely generated) profinite groups in which two formal Dirichlet series, the normal su...
Consider a profinite group containing only finitely many open subgroups of index n, for any n: then ...
We examine finitely generated profinite groups in which two formal Dirichlet series, the subgroup ze...
In this thesis, we investigate the connection between finitely generated profinite groups G and the ...
Given a finitely generated profinite group G, a formal Dirichlet series P_G(s) is associated to G ...
To a finitely generated profinite group G, a formal Dirichlet series PG(s) =σn ϵNan(G)/ns is associa...
AbstractWe employ the concept of crown to study the generalized Euler factors of the probabilistic z...
We discuss whether finiteness properties of a profinite group G can be deduced from the coefficients...
AbstractLet G be a finite group; there exists a uniquely determined Dirichlet polynomial PG(s) such ...
It has been conjectured by Mann that the infinite sum ∑ μ(H,G)/|G:H|^ s , where H ranges over all o...
We prove that if the probabilistic zeta function P-G(s) of a finitely generated profinite group G is...
A conjecture of A. Mann asks if every finitely generated profinite group that is PFG has PBMN. Here ...
We discuss finiteness properties of a profinite group G whose probabilistic zeta function P(G,s) is ...
summary:This article is dedicated to soluble groups, in which pronormality is a transitive relation....
A group G is invariably generated by a subset S of G if G = \u3008sg(s) | s 08 S\u3009 for each cho...
We examine (finitely generated) profinite groups in which two formal Dirichlet series, the normal su...
Consider a profinite group containing only finitely many open subgroups of index n, for any n: then ...
We examine finitely generated profinite groups in which two formal Dirichlet series, the subgroup ze...
In this thesis, we investigate the connection between finitely generated profinite groups G and the ...
Given a finitely generated profinite group G, a formal Dirichlet series P_G(s) is associated to G ...
To a finitely generated profinite group G, a formal Dirichlet series PG(s) =σn ϵNan(G)/ns is associa...
AbstractWe employ the concept of crown to study the generalized Euler factors of the probabilistic z...
We discuss whether finiteness properties of a profinite group G can be deduced from the coefficients...
AbstractLet G be a finite group; there exists a uniquely determined Dirichlet polynomial PG(s) such ...
It has been conjectured by Mann that the infinite sum ∑ μ(H,G)/|G:H|^ s , where H ranges over all o...
We prove that if the probabilistic zeta function P-G(s) of a finitely generated profinite group G is...
A conjecture of A. Mann asks if every finitely generated profinite group that is PFG has PBMN. Here ...
We discuss finiteness properties of a profinite group G whose probabilistic zeta function P(G,s) is ...
summary:This article is dedicated to soluble groups, in which pronormality is a transitive relation....
A group G is invariably generated by a subset S of G if G = \u3008sg(s) | s 08 S\u3009 for each cho...