Tag - Geometric group theory

Ilya Kapovich: Non-linear words and free groups

29th April, 2021

An important theme in the study of combinatorics of words involves looking for models of nonlinear words, that is words that are not indexed by segments of integers. We discuss one such model arising from the theory of Stallings subgroup graphs. This model naturally leads to the notion of subset currents on free groups (and on other word-hyperbolic groups) which are measure-theoretic analogs of conjugacy classes of finitely generated subgroups. Many new features manifest themselves in this context, including connections with the Hanna Neumann Conjecture and Whitehead's algorithm for subgroups.

Dawid Kielak: Recognizing surface groups

8th March, 2021

I will address two problems about recognizing surface groups. The first one is the classical problem of classifying Poincaré duality groups in dimension 2. I will present a new approach to this, joint with Peter Kropholler. The second problem is about recognizing surface groups among one-relator groups. Here I will present a new partial result, joint with Giles Gardam and Alan Logan.

Charlotte Hoffmann: Short words of high imprimitivity rank yield hyperbolic one-relator groups

8th March, 2021

It is a long-standing question whether a group of type F that does not contain Baumslag–Solitar subgroups is necessarily hyperbolic. One-relator groups are of type F and Louder and Wilton showed that if the defining relator has imprimitivity rank greater than 2, they do not contain Baumslag-Solitar subgroups, so they conjecture that such groups are hyperbolic. Cashen and I verified the conjecture computationally for relators of length at most 17. In this talk I'll introduce hyperbolic groups and the imprimitivity rank of elements in a free group. I'll also discuss how to verify hyperbolicity using versions of combinatorial curvature on van Kampen diagrams.

Paul-Henry Leemann: Cayley graphs with few automorphisms

22nd February, 2021

Let G be a group and S a generating set. Then the group G naturally acts on the Cayley graph Cay(G,S) by left multiplications. The group G is said to be rigid if there exists an S such that the only automorphisms of Cay(G,S) are the ones coming from the action of G. While the classification of finite rigid groups was achieved in 1981, few results were known about infinite groups. In a recent work, with M. de la Salle we gave a complete classification of infinite finitely generated rigid groups. As a consequence, we also obtain that every finitely generated group admits a Cayley graph with countable automorphism group.

Alina Vdovina: Buildings, quaternions and Drinfeld-Manin solutions of Yang-Baxter equations

11th February, 2021

We will give a brief introduction to the theory of buildings and present their geometric, algebraic and arithmetic aspects. In particular, we present explicit constructions of infinite families of quaternionic cube complexes, covered by buildings. We will introduce new connections of geometric group theory and theoretical physics by using quaternionic lattices to find new infinite families of Drinfeld-Manin solutions of Yang-Baxter equations.

François Le Maître: Dense totipotent free subgroups of full groups

25th January, 2021

In this talk, we will be interested in measure-preserving actions of countable groups on standard probability spaces, and more precisely in the partitions of the space into orbits that they induce, also called measure-preserving equivalence relations. In 2000, Gaboriau obtained a characterization of the ergodic equivalence relations which come from non-free actions of the free group on n > 1 generators: these are exactly the equivalence relations of cost less than n. A natural question is: how non-free can these actions be made, and what does the action on each orbit look like? We will obtain a satisfactory answer by showing that the action on each orbit can be made totipotent, which roughly means 'as rich as possible', and furthermore that the free group can be made dense in the ambient full group of the equivalence relation.

Henry Wilton: Negative immersions and one-relator groups

4th December, 2020

One-relator groups G=F/≪w≫ pose a challenge to geometric group theorists. On the one hand, they satisfy strong algebraic constraints (eg Magnus's theorem that the word problem is soluble). On the other hand, they are not susceptible to geometric techniques, since some of them (such as Baumslag-Solitar groups) exhibit extremely pathological behaviour.

I will relate the subgroup structure of one-relator groups to a measure of complexity for the relator w introduced by Puder - the primitivity rank π(w), the smallest rank of a subgroup of F containing w as an imprimitive element. A sample application is that every subgroup of G of rank less than π(w) is free. These results in turn provoke geometric conjectures that suggest a beginning of a geometric theory of one-relator groups.

Agatha Atkarskaya: Small cancellation rings

4th December, 2020

The theory of small cancellation groups is well known. In this paper we introduce the notion of Group-like Small Cancellation Ring. This is the main result of the paper. We define this ring axiomatically, by generators and defining relations. The relations must satisfy three types of axioms. The major one among them is called the Small Cancellation Axiom. We show that the obtained ring is non-trivial. Moreover, we show that this ring enjoys a global filtration that agrees with relations, find a basis of the ring as a vector space and establish the corresponding structure theorems. It turns out that the defined ring possesses a kind of Gröbner basis and a greedy algorithm. Finally, this ring can be used as a first step towards the iterated small cancellation theory which hopefully plays a similar role in constructing examples of rings with exotic properties as small cancellation groups do in group theory. Joint results with A. Kanel-Belov, E. Plotkin, E. Rips.

Anna Erschler: Ordering Ratio Function and Travelling Salesman Breakpoint for Groups and Metric Spaces

4th December, 2020

(Abstract taken from arXiv paper.) We study asymptotic invariants of metric spaces and infinite groups related to the universal Travelling Salesman Problem (TSP). We prove that spaces with doubling property (in particular virtually nilpotent groups) admit Gap for Ordering Ratio functions which holds for all orders on these spaces. We describe Travelling Salesman Breakpoint for finite graphs. We characterize groups with Travelling Salesman Breakpoint ≤ 3 as virtually free ones. We show that Ordering Ratio function is bounded (which is the best possible situation) for all uniformly discrete δ-hyperbolic spaces of bounded geometry, in particular for all hyperbolic groups. We prove that any metric space, containing weakly a sequence of arbitrarily large cubes, has infinite Travelling Salesman Breakpoint; this means that any order on such spaces satisfies OR(s)=s for all s. This is the worst possible case for Ordering Ratio functions. For a sequence of finite graphs, we provide a sufficient spectral condition for OR(s)=s. This condition is in particular satisfied for any sequence of expander graphs. Under this stronger assumption of being a family of expander graphs, we prove a stronger claim about snakes of bounded width. We show that any metric space of finite Assouad-Nagata dimension admits an order satisfying OR(s) ≤ Const ln s, and discuss general Gap Problems for Ordering Ratio functions.

William Hautekiet: Automorphism groups of transcendental field extensions

23rd November, 2020

It is well-known that the Galois group of an (infinite) algebraic field extension is a profinite group. When the extension is transcendental, the automorphism group is no longer compact, but has a totally disconnected locally compact structure (TDLC for short). The study of TDLC groups was initiated by van Dantzig in 1936 and then restarted by Willis in 1994. In this talk some of Willis' concepts, such as tidy subgroups, the scale function, flat subgroups and directions are introduced and applied to examples of automorphism groups of transcendental field extensions. It remains unknown whether there exist conditions that a TDLC group must satisfy to be a Galois group. A suggestion of such a condition is made.