Add to ORKGWe study Richard Thompson\u27s group V, and some generalizations of this group. V was one of the first two examples of a finitely presented, infinite, simple group. Since being discovered in 1965, V has appeared in a wide range of mathematical subjects. Despite many years of study, much of the structure of V remains unclear. Part of the difficulty is that the standard presentation for V is complicated, hence most algebraic techniques have yet to prove fruitful. This thesis obtains some further understanding of the structure of V by showing the nonexistence of the wreath product [special characters omitted] as a subgroup of V, proving a conjecture of Bleak and Salazar-Dìaz. This result is achieved primarily by studying the topological dynami...
PhD ThesisThis thesis consists of two parts. Part I of this thesis is concerned with the Higman-Tho...
Abstract. We discuss metric and combinatorial properties of Thompson’s group T, such as the normal f...
Results in C∗ algebras, of Matte Bon and Le Boudec, and of Haagerup and Olesen, apply to the R. Thom...
We study Richard Thompson\u27s group V, and some generalizations of this group. V was one of the fir...
We study Richard Thompson\u27s group V, and some generalizations of this group. V was one of the fir...
We investigate some product structures in R. Thompson's group $ V$, primarily by studying the topolo...
We investigate some product structures in R. Thompson's group V, primarily by studying the topologic...
We investigate some product structures in R. Thompson's group V, primarily by studying the topologic...
It is shown in Lehnert and Schweitzer ('The co-word problem for the Higman-Thompson group is context...
We find some perhaps surprising isomorphism results for the groups {Vn(G)}, where Vn(G) is a supergr...
The recent paper The further chameleon groups of Richard Thompson and Graham Higman: automorphisms v...
We discuss metric and combinatorial properties of Thompson\u27s group T, including normal forms for ...
Abstract. We discuss metric and combinatorial properties of Thompson’s group T, such as the normal f...
We consider generalisations of Thompson''s group V, denoted by Vr(S), which also include the groups ...
We discuss metric and combinatorial properties of Thompson's group T, such as the normal forms for e...
PhD ThesisThis thesis consists of two parts. Part I of this thesis is concerned with the Higman-Tho...
Abstract. We discuss metric and combinatorial properties of Thompson’s group T, such as the normal f...
Results in C∗ algebras, of Matte Bon and Le Boudec, and of Haagerup and Olesen, apply to the R. Thom...
We study Richard Thompson\u27s group V, and some generalizations of this group. V was one of the fir...
We study Richard Thompson\u27s group V, and some generalizations of this group. V was one of the fir...
We investigate some product structures in R. Thompson's group $ V$, primarily by studying the topolo...
We investigate some product structures in R. Thompson's group V, primarily by studying the topologic...
We investigate some product structures in R. Thompson's group V, primarily by studying the topologic...
It is shown in Lehnert and Schweitzer ('The co-word problem for the Higman-Thompson group is context...
We find some perhaps surprising isomorphism results for the groups {Vn(G)}, where Vn(G) is a supergr...
The recent paper The further chameleon groups of Richard Thompson and Graham Higman: automorphisms v...
We discuss metric and combinatorial properties of Thompson\u27s group T, including normal forms for ...
Abstract. We discuss metric and combinatorial properties of Thompson’s group T, such as the normal f...
We consider generalisations of Thompson''s group V, denoted by Vr(S), which also include the groups ...
We discuss metric and combinatorial properties of Thompson's group T, such as the normal forms for e...
PhD ThesisThis thesis consists of two parts. Part I of this thesis is concerned with the Higman-Tho...
Abstract. We discuss metric and combinatorial properties of Thompson’s group T, such as the normal f...
Results in C∗ algebras, of Matte Bon and Le Boudec, and of Haagerup and Olesen, apply to the R. Thom...