Algebra

Algebra

The traditional objects of study in algebra are algebraic structures such as groups, rings, and modules. However, the developments of the last decades have increasingly emphasised the subject's connections with other areas of mathematics and science, such as geometry, topology, classical and quantum field theory, integrable systems, and theoretical computing science.

Here in Glasgow, we study both classical and modern problems and questions in algebra. The research interests of our staff members include geometric group theory, both commutative and noncommutative ring theory, as well as topics in representation theory and homological algebra.  All information about our group, our members, our activities, and a full list of our expertise, can be found at our Core Structures webpage.

Our group has an active PhD student community, and every year we admit new PhD students.  We welcome applications from across the world, and we encourage you to browse our available supervisors, and also to consult our general advice on how to navigate the application process.

The non-exhaustive list under Postgraduate Opportunities contains a sample of the types of PhD projects that our group offers.

Staff

Dr Spiros Adams-Florou  Lecturer

Algebraic K-theory, L-Theory

Member of other research groups: Geometry and Topology

  • Personal Website
  • Publications
  • Dr Alex Bartel  Senior lecturer

    • Algebraic number theory:
      • Galois module structures, e.g. the structure of the ring of integers of a number field as a Galois module, or of its unit group, or of the Mordell-Weil group of an abelian variety over a number field;
      • Arithmetic statistics, especially the Cohen―Lenstra heuristics on class groups of number fields and their generalisations;
      • Arithmetic of elliptic curves over number fields.
    • Representation theory of finite groups:
      • Integral representations of finite groups;
      • Connections between the Burnside ring and the representation ring of a finite group;
      • Applications of the above to number theory and geometry.
    • Geometry and topology:
      • Actions of finite groups of low-dimensional manifolds.

    Member of other research groups: Geometry and Topology

  • Personal Website
  • Dr Gwyn Bellamy  Senior lecturer

    My research interests are in geometric representation theory and its connections to algebraic geometry and algebraic combinatorics. In particular, I am interested in all aspects of symplectic representations, including symplectic reflection algebras, resolutions of symplectic singularties, D-modules and deformation-quantization algebras.

    Member of other research groups: Geometry and Topology
    Research students: Niall Hird, Tomasz Przezdziecki, Kellan Steele, Kellan Steele

  • Personal Website
  • Publications
  • Dr Tara Brendle  Professor of Mathematics

    Geometric group theory; mapping class groups of surface

    Member of other research groups: Geometry and Topology
    Research students: Alan McLeay, Luke Jeffreys

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  • Publications
  • Dr Kenneth A Brown  Professor of Mathematics

    Noncommutative algebra; Hopf algebras; homological algebra

    Member of other research groups: Geometry and Topology
    Research student: Miguel Couto

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  • Publications
  • Dr Ben Davison  Lecturer

    Algebraic geometry, geometric representation theory, cluster algebras, Higgs bundles, Nakajima quiver varieties

    Member of other research groups: Geometry and Topology
    Research student: Ogier Van Garderen

  • Personal Website
  • Publications
  • Dr Sam Dean  Lecturer

  • Dr Mikhail Feigin  Senior lecturer

    Representations of Cherednik algebras; rings of quasi-invariants

    Member of other research groups: Integrable Systems and Mathematical Physics, Geometry and Topology
    Research students: Maali Alkadhem, Georgios Antoniou

  • Personal Website
  • Publications
  • Dr Jamie Gabe  Honorary Research Fellow

    Member of other research groups: Mathematical Biology, Geometry and Topology

  • Dr Vaibhav Gadre  Lecturer

    Teichmuller Dynamics, Mapping Class Groups. 

    Member of other research groups: Geometry and Topology
    Research student: Luke Jeffreys

  • Personal Website
  • Publications
  • Dr Sira Gratz  Lecturer

    representation theory of algebras, cluster algebras and cluster categories, triangulated categories

    Postgraduate opportunities: Cluster Algebras and their implementation on the computer

  • Dr Dimitra Kosta  LKAS Fellowship

    Markov bases of toric ideals; graphs; matroids; factoriality of threefolds.

    Member of other research groups: Statistical Methodology, Environmental Statistics, Biostatistics and Statistical Genetics, Geometry and Topology

  • Personal Website
  • Dr Alan Logan  Jack Fellowship

    Geometric and combinatorial group theory

  • Personal Website
  • Publications
  • Dr Ciaran Meachan  Lecturer

    Member of other research groups: Geometry and Topology

  • Personal Website
  • Publications
  • Dr Greg Stevenson  Lecturer

    Member of other research groups: Geometry and Topology

  • Personal Website
  • Dr Christian Voigt  Senior lecturer

    Noncommutative geometry; K-theory; Quantum groups

    Member of other research groups: Geometry and Topology, Analysis
    Research students: Jamie Antoun, Andrew Monk, Samuel Evington

  • Personal Website
  • Publications
  • Prof Michael Wemyss  Professor of Mathematics

    Algebraic geometry and its interactions, principally between noncommutative and homological algebra, resolutions of singularities, and the minimal model program.  All related structures, including: deformation theory, derived categories, stability conditions, associated commutative and homological structures and their representation theory, curve invariants, McKay correspondence, Cohen--Macaulay modules, finite dimensional algebras and cluster-tilting theory.

    Member of other research groups: Geometry and Topology
    Research students: Sarah Kelleher (Mackie), Ogier Van Garderen

  • Personal Website
  • Publications
  • Dr Stuart White  Professor of Mathematics

    Rigidity properties for groups; noncommutative geometry

    Member of other research groups: Geometry and Topology, Analysis
    Research student: Samuel Evington
    Postgraduate opportunities: Interactions between von Neumann and C*-algebras, Operator Algebras associated to groups

  • Personal Website
  • Publications
  • Dr Mike Whittaker  Lecturer

    Operator algebras, self-similar groups, and Zappa-Szep products.

    Member of other research groups: Geometry and Topology, Analysis
    Research students: Dimitrios Gerontogiannis , Mustafa Ozkaraca, Jamie Antoun
    Postgraduate opportunities: Aperiodic substitution tilings and their C*-algebras., Operator algebras associated to self-similar actions.

  • Personal Website
  • Publications
  • Dr Billy Woods  Lecturer

  • Dr Joachim Zacharias  Reader

    C*-algebras, their classification and amenability properties; special examples of C*-algebras; K-theory and non commutative topology, noncommutative dynamical systems, geometric group theory with applications to C*-algebras.

    Member of other research groups: Integrable Systems and Mathematical Physics, Geometry and Topology, Analysis
    Research students: Luke Hamblin, Dimitrios Gerontogiannis

  • Personal Website
  • Publications

  • Postgraduate opportunities

    Operator algebras associated to self-similar actions. (PhD)

    Supervisors: Mike Whittaker
    Relevant research groups: Algebra, Analysis, Geometry and Topology

    This project will focus on self-similar groups and their operator algebras. The primary aim will be to examine a new class of groups that act self-similarly on the path space of a graph and to study the noncommutative geometry of a natural class of operator algebras associated to these self-similar groups.

    Self-similar groups are an important and active new area of group theory. The most famous example is the Grigorchuk group, which was the first known example of a group with intermediate growth. This makes investigating C*-algebras associated to them particularly interesting. In particular, these groups are often defined by their action on a graph, and the associated C*-algebra encodes both the group and path space of the graph in a single algebraic object, as well as the interaction between them.

     

    Operator Algebras associated to groups (PhD)

    Supervisors: Stuart White
    Relevant research groups: Algebra, Analysis

    Operator algebras (both C*-algebras and von Neumann algebras) arise naturally from groups and provide a framework for the study of unitary representations.  A driving question is how the structure of the operator algebra reflects that of the original group. This direction of research arguably dates back to the foundational papers of Murray and von Neumann and has repeatedly generated profound new insights over the years.  Two possible avenues for PhD research are described below.

    Rigidity asks to what extent the group is `remembered' by the operator algebra.  There has been dramatic progress in recent years following the discovery of the first examples of von Neumann rigid groups by Ioana, Popa and Vaes in 2012. In the setting of C*-algebras, questions of rigidity are very tantalising; both in the setting of amenable groups, and also finding von Neumann rigid groups which are C*-simple.

    A striking new connection to boundary actions developed by Kalentar and Kennedy provides a new framework to examine the situation when a reduced group C*-algebra is simple: in particular how much extra information does one gain from knowing that there is an underlying group?  To what extent can one view these reduced group C*-algebras as mirroring behaviour of the associated von Neumann factor?

    One particularly nice feature of working with operator algebras associated to groups is that there are concrete examples you can compute with in order to develop intutiution and understanding.

     

    Algebraic Combinatorics and Symbolic Computation (PhD)

    Supervisors: Christian Korff
    Relevant research groups: Algebra, Integrable Systems and Mathematical Physics

    This project will look at topics in algebraic combinatorics, for example the ring of symmetric functions, the Robinson-Schensted-Knuth correspondence, crystal graphs, and their implementation in symbolic computational software. An example can be found here:

    http://demonstrations.wolfram.com/KirillovReshetikhinCrystals/

    Emphasis of the project will be on the efficient design and writing of algorithms with the aim to provide data for open research problems in algebraic combinatorics.

    The ideal candidate should have a dual interest in mathematics and computer science and, in particular, already possess some programming experience. As part of the project it is envisaged to spend some time with a private software company to explore a possible commercialisation of the resulting computer packages.

     

    Cluster Algebras and their implementation on the computer (PhD)

    Supervisors: Sira Gratz, Christian Korff
    Relevant research groups: Algebra, Integrable Systems and Mathematical Physics

    This project will look at cluster algebras and their implementation in symbolic computational software. An example can be found here:

    http://demonstrations.wolfram.com/ClusterAlgebras/

    Emphasis of the project will be on the efficient design and writing of algorithms with the aim to provide data for open research problems in cluster algebras as well as their visualisation, e.g. in the context of triangulations of surfaces.

    The ideal candidate should have a dual interest in algebra and computer science and, in particular, already possess some programming experience. As part of the project it is envisaged to spend some time with a private software company to explore a possible commercialisation of the resulting computer packages.