Add to ORKGThis thesis presents a construction of a new class of groups that are type FP but are not finitely presentable. This is the first such construction that does not rely on Morse theory on cubical complexes and so reinforces the rift between the algebraic property and its geometric counterpart. The central tool used here is small cancellation theory which allows us a comparatively simple way to prove the above claim and also allowsaccess to further results regarding these groups
We generalize Gruber–Sisto’s construction of the coned-off graph of a small cancellation group to bu...
An interplay between algebra and topology goes in many ways. Given a space X, we can study its homol...
International audienceWe develop a theory of small cancellation theory in the variety of Burnside gr...
We construct an uncountable family of groups of type FP. In contrast to every previous construction...
Abstract. We construct small cancellation labellings for some infinite sequences of finite graphs of...
Skipper R, Witzel S, Zaremsky MCB. Simple groups separated by finiteness properties. INVENTIONES MAT...
Abstract. We construct small cancellation labellings for some infinite sequences of finite graphs of...
We study a family of finitely generated residually finite small cancellation groups. These groups ar...
We build quasi-isometry invariants of relatively hyperbolic groups which detect the hyperbolic parts...
Abstract. We extend fundamental results of small cancellation theory to groups whose presentations s...
We use basic tools of descriptive set theory to prove that a closed set S of marked groups has 2ℵ0 q...
We use the interplay between combinatorial and coarse geometric versions of negative curvature to in...
We study the geometry of inûnitely presented groups satisfying the small cancellation condition C′(1...
We study the geometry of inûnitely presented groups satisfying the small cancellation condition C′(1...
AbstractThis paper gives an example of a finitely generated group G and a monomorphism α : G→G such ...
We generalize Gruber–Sisto’s construction of the coned-off graph of a small cancellation group to bu...
An interplay between algebra and topology goes in many ways. Given a space X, we can study its homol...
International audienceWe develop a theory of small cancellation theory in the variety of Burnside gr...
We construct an uncountable family of groups of type FP. In contrast to every previous construction...
Abstract. We construct small cancellation labellings for some infinite sequences of finite graphs of...
Skipper R, Witzel S, Zaremsky MCB. Simple groups separated by finiteness properties. INVENTIONES MAT...
Abstract. We construct small cancellation labellings for some infinite sequences of finite graphs of...
We study a family of finitely generated residually finite small cancellation groups. These groups ar...
We build quasi-isometry invariants of relatively hyperbolic groups which detect the hyperbolic parts...
Abstract. We extend fundamental results of small cancellation theory to groups whose presentations s...
We use basic tools of descriptive set theory to prove that a closed set S of marked groups has 2ℵ0 q...
We use the interplay between combinatorial and coarse geometric versions of negative curvature to in...
We study the geometry of inûnitely presented groups satisfying the small cancellation condition C′(1...
We study the geometry of inûnitely presented groups satisfying the small cancellation condition C′(1...
AbstractThis paper gives an example of a finitely generated group G and a monomorphism α : G→G such ...
We generalize Gruber–Sisto’s construction of the coned-off graph of a small cancellation group to bu...
An interplay between algebra and topology goes in many ways. Given a space X, we can study its homol...
International audienceWe develop a theory of small cancellation theory in the variety of Burnside gr...