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Maths Research Associates 2021 Southampton

Lead Research Organisation: University of Southampton
Department Name: Sch of Mathematical Sciences

Abstract

Abstracts are not currently available in GtR for all funded research. This is normally because the abstract was not required at the time of proposal submission, but may be because it included sensitive information such as personal details.

Publications

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Andrew N (2022) Free-by-cyclic groups, automorphisms and actions on nearly canonical trees in Journal of Algebra

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Andrew N (2022) A Bass-Serre theoretic proof of a theorem of Romanovskii and Burns in Communications in Algebra

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ANDREW N (2024) Centralisers of linear growth automorphisms of free groups in Mathematical Proceedings of the Cambridge Philosophical Society

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Bourg P (2021) Critical collapse of a spherically symmetric ultrarelativistic fluid in 2 + 1 dimensions in Physical Review D

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Capone F (2023) Phase space renormalization and finite BMS charges in six dimensions in Journal of High Energy Physics

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Kovensky N (2023) Phases of cold holographic QCD: Baryons, pions and rho mesons in SciPost Physics

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Kovensky N (2022) Building a realistic neutron star from holography in Physical Review D

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Kropholler P (2023) Finitely generated groups acting uniformly properly on hyperbolic space in Groups, Geometry, and Dynamics

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Leary I (2022) On the virtual and residual properties of a generalization of Bestvina-Brady groups in Mathematische Zeitschrift

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Petrosyan N (2022) Hyperbolicity and bounded-valued cohomology

 
Description This award funded one year fellowships for early career researchers in mathematical sciences, to facilitate them to develop independent research agendas following their doctoral research. All recipients of these fellowships have continued their academic careers, progressing to postdoctoral fellowships at institutions such as Bristol and Oxford. The research carried out by the fellows during their fellowships resulted in strong mathematics papers in the areas of group theory, particularly around finite groups, and in general relativity. The latter results have applications to the next generation of experiments exploring gravitational waves.
Exploitation Route The principal outcomes of this funding are publications in mathematical sciences, which will be used by both the mathematical sciences research community and the broader research community for future developments in group theory, general relativity and gravitational waves. Wider impacts on mathematical sciences are usually applicable in the much longer term, but the group theory results could be useful for future developments in chemistry and related areas.
Sectors Chemicals

Education

Other