AbstractWe investigate word growth and structure of certain infinite families of finite groups. This work is motivated by results of Bass, Wolf, Milnor, Gromov, and Grigorchuk on the word growth and structure of infinite groups. We define word growth for families of finite groups, and prove structure theorems relating their growth types to their group structures. Some results are analogous to the infinite cases. However, differences are also noted, as well as other results
For an algebraic structure A denote by d(A) the smallest size of a generating set for A, and let d(A...
AbstractWe present a short, self-contained, relatively simple proof to the growth dichotomy of linea...
AbstractLet R be a nonperiodic semigroup variety satisfying the nontrivial identity Zn=W, where Zn i...
Given a finitely generated group, we study various growth functions and growth series. We calculate ...
We present an analytic technique for estimating the growth for groups of intermediate growth. We app...
To every finitely generated group G we can assign an equivalence class of growth function. That is, ...
Dedicated to John Milnor on the occasion of his 80th birthday. Abstract. We present a survey of resu...
In the first, mostly expository, part of this paper, a graded Lie algebra is associated to every gro...
We describe a sufficient condition for a finitely generated group to have infinite asymptotic dimens...
Includes bibliographical references (pages [113]-114)... It is already known that if a group is abel...
In this thesis we study various variants of word growth in finitely generated groups, focussing on ...
AbstractThis paper presents a theorem on the growth rate of the orbit-counting sequences of a primit...
We describe a sufficient condition for a finitely generated group to have infinite asymptotic dimens...
For a semigroup S its d-sequence is d(S) = (d1, d2, d3, . . .), where di is the smallest number of e...
An explicit description of the 2-group of intermediate growth found by Grigorchuk is given. We also ...
For an algebraic structure A denote by d(A) the smallest size of a generating set for A, and let d(A...
AbstractWe present a short, self-contained, relatively simple proof to the growth dichotomy of linea...
AbstractLet R be a nonperiodic semigroup variety satisfying the nontrivial identity Zn=W, where Zn i...
Given a finitely generated group, we study various growth functions and growth series. We calculate ...
We present an analytic technique for estimating the growth for groups of intermediate growth. We app...
To every finitely generated group G we can assign an equivalence class of growth function. That is, ...
Dedicated to John Milnor on the occasion of his 80th birthday. Abstract. We present a survey of resu...
In the first, mostly expository, part of this paper, a graded Lie algebra is associated to every gro...
We describe a sufficient condition for a finitely generated group to have infinite asymptotic dimens...
Includes bibliographical references (pages [113]-114)... It is already known that if a group is abel...
In this thesis we study various variants of word growth in finitely generated groups, focussing on ...
AbstractThis paper presents a theorem on the growth rate of the orbit-counting sequences of a primit...
We describe a sufficient condition for a finitely generated group to have infinite asymptotic dimens...
For a semigroup S its d-sequence is d(S) = (d1, d2, d3, . . .), where di is the smallest number of e...
An explicit description of the 2-group of intermediate growth found by Grigorchuk is given. We also ...
For an algebraic structure A denote by d(A) the smallest size of a generating set for A, and let d(A...
AbstractWe present a short, self-contained, relatively simple proof to the growth dichotomy of linea...
AbstractLet R be a nonperiodic semigroup variety satisfying the nontrivial identity Zn=W, where Zn i...
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