Inverse Deformation Problems for Special Linear and Symplectic groups

Abstract

The principal result of this thesis is an affirmative answer to the inverse deformation problem which asks: Does a given complete noetherian local ring have a
realisation as the unrestricted universal deformation ring of any residual representation? This is proved in two ways: firstly a complete answer is given using the
family of special linear groups over complete noetherian local rings and secondly,
if the finite field does not have 3 elements or does not have characteristic 2, it is answered using
the family of symplectic groups.
Of central importance to the result in the symplectic case is the establishment
of a structure theorem for subgroups of special linear groups which surject onto
symplectic groups over finite fields.

Metadata

Supervisors:	Manoharmayum, Jayanta
Awarding institution:	University of Sheffield
Academic Units:	The University of Sheffield > Faculty of Science (Sheffield) > School of Mathematics and Statistics (Sheffield)
Identification Number/EthosID:	uk.bl.ethos.680587
Depositing User:	Mr Timothy Eardley
Date Deposited:	15 Mar 2016 13:10
Last Modified:	03 Oct 2016 13:09
Open Archives Initiative ID (OAI ID):	oai:etheses.whiterose.ac.uk:12181

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Inverse Deformation Problems for Special Linear and Symplectic groups

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Timothy Eardley PhD Thesis

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