Donaldson-Thomas theory and cohomological Hall algebras of character stacks
dc.contributor.advisor
Davison, Ben
dc.contributor.advisor
Jordan, David
dc.contributor.author
Mistry, Vivek
dc.contributor.sponsor
The Royal Society
en
dc.date.accessioned
2023-01-18T15:08:48Z
dc.date.available
2023-01-18T15:08:48Z
dc.date.issued
2023-01-18
dc.description.abstract
Given a smooth finitely generated algebra with a potential one can study the refined
Donaldson-Thomas theory of its moduli stack of representations via motivic or cohomological
methods. In this thesis we focus on fundamental group algebras whose
stacks of representations are known as character varieties or character stacks. These
arise naturally in the realm of algebraic geometry and Donaldson-Thomas theory via
the non-abelian Hodge correspondence which relates the study of Higgs bundles to
character varieties.
In the first part of this thesis we consider approaches to studying the motivic
Donaldson-Thomas invariants of fundamental group algebras over mapping tori of Riemann
surfaces by constructing an isomorphism between the fundamental group algebra
and the Jacobi algebra of a so-called brane tiling on the Riemann surface. Using the
critical locus structure of a Jacobi algebra this presents us with a natural way to study
the motivic Donaldson-Thomas invariants of the character varieties of mapping tori
and we present ideas on how this can be accomplished.
In the second part of this thesis we focus on the cohomological Donaldson-Thomas
theory of fundamental group algebras over Riemann surfaces. Again utilising brane
tilings we prove that the cohomological Hall algebra of the character variety of a Riemann
surface has a natural 2 Calabi-Yau structure arising from a 2D Jacobi algebra,
and hence can be obtained by dimensional reduction of the corresponding 3D cohomological
Hall algebra of the 3D Jacobi algebra.
en
dc.identifier.uri
https://hdl.handle.net/1842/39727
dc.identifier.uri
http://dx.doi.org/10.7488/era/2976
dc.language.iso
en
en
dc.publisher
The University of Edinburgh
en
dc.subject
Donaldson-Thomas theory
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dc.subject
cohomological Hall algebras
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dc.subject
character stacks
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dc.subject
non-abelian Hodge correspondence
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dc.subject
Riemann surfaces
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dc.subject
Jacobi algebra
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dc.subject
brane tiling
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dc.subject
Donaldson-Thomas invariants
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dc.subject
mapping tori
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dc.subject
natural 2 Calabi-Yau structure
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dc.subject
2D Jacobi algebra
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dc.subject
3D Jacobi algebra
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dc.title
Donaldson-Thomas theory and cohomological Hall algebras of character stacks
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dc.title.alternative
The Donaldson-Thomas theory and cohomological Hall algebras of character stacks
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dc.type
Thesis or Dissertation
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dc.type.qualificationlevel
Doctoral
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dc.type.qualificationname
PhD Doctor of Philosophy
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