AbstractWe discuss a general approach to the proof of a theorem of Pickel on the finiteness of the number of isomorphism classes of finitely generated nilpotent groups with isomorphic finite quotients, which is applicable to handle other cases of finitely generated groups
Group theory and its applications are relevant in many areas of mathematics. Our project considers f...
AbstractThis paper deals with the isomorphism problem for integral group rings of infinite groups. I...
We show that the isomorphism relation for finitely generated solvable groups of class 3 is a weakly ...
AbstractWe discuss a general approach to the proof of a theorem of Pickel on the finiteness of the n...
AbstractWe answer a question due to Babai and Goodman by showing that for each natural number n ther...
We answer a question due to Babai and Goodman by showing that for each natural number n there exists...
A subset S of a group G is called an Engel set if, for all x, y ∈ S, there is a non-negative integer...
A subset S of a group G is called an Engel set if, for all x, y ∈ S, there is a non-negative integer...
A subset S of a group G is called an Engel set if, for all x, y ∈ S, there is a non-negative integer...
AbstractA subset S of a group G is called an Engel set if, for all x,y∈S, there is a non-negative in...
Abstract. Let n and k be positive integers. We say that a group G satisfies the condition E(n) (resp...
Let g,c denote positive integers. A group is said to have type (g→c) if every subgroup which can be ...
We identify two generalizations of the notion of a finitely generated nilpotent. Thus a nilpotent gr...
A nilpotent group G is fgp if Gp is finitely generated (fg) as a p-local group for all primes p; it ...
A nilpotent group G is fgp if Gp is finitely generated (fg) as a p-local group for all primes p; it ...
Group theory and its applications are relevant in many areas of mathematics. Our project considers f...
AbstractThis paper deals with the isomorphism problem for integral group rings of infinite groups. I...
We show that the isomorphism relation for finitely generated solvable groups of class 3 is a weakly ...
AbstractWe discuss a general approach to the proof of a theorem of Pickel on the finiteness of the n...
AbstractWe answer a question due to Babai and Goodman by showing that for each natural number n ther...
We answer a question due to Babai and Goodman by showing that for each natural number n there exists...
A subset S of a group G is called an Engel set if, for all x, y ∈ S, there is a non-negative integer...
A subset S of a group G is called an Engel set if, for all x, y ∈ S, there is a non-negative integer...
A subset S of a group G is called an Engel set if, for all x, y ∈ S, there is a non-negative integer...
AbstractA subset S of a group G is called an Engel set if, for all x,y∈S, there is a non-negative in...
Abstract. Let n and k be positive integers. We say that a group G satisfies the condition E(n) (resp...
Let g,c denote positive integers. A group is said to have type (g→c) if every subgroup which can be ...
We identify two generalizations of the notion of a finitely generated nilpotent. Thus a nilpotent gr...
A nilpotent group G is fgp if Gp is finitely generated (fg) as a p-local group for all primes p; it ...
A nilpotent group G is fgp if Gp is finitely generated (fg) as a p-local group for all primes p; it ...
Group theory and its applications are relevant in many areas of mathematics. Our project considers f...
AbstractThis paper deals with the isomorphism problem for integral group rings of infinite groups. I...
We show that the isomorphism relation for finitely generated solvable groups of class 3 is a weakly ...
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