Poincaré type Kähler metrics and stability on toric varieties
In this thesis we study the relationship between the existence of extremal Kähler metrics and stability. We introduce a space of symplectic potentials for toric manifolds, which we show gives metrics with mixed Poincaré type and cone angle singularities. We show uniqueness and that existence implies...
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Imperial College London
2016
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ndltd-bl.uk-oai-ethos.bl.uk-7007092018-06-06T15:27:03ZPoincaré type Kähler metrics and stability on toric varietiesSektnan, Lars MartinDonaldson, Simon2016In this thesis we study the relationship between the existence of extremal Kähler metrics and stability. We introduce a space of symplectic potentials for toric manifolds, which we show gives metrics with mixed Poincaré type and cone angle singularities. We show uniqueness and that existence implies stability for extremal metrics arising from these potentials. For quadrilaterals, we give a computable criterion for stability in certain cases, giving a definite log-stable region for generic quadrilaterals. We use computational tools to find new examples of stable and unstable toric manifolds. For Poincaré type manifolds with an S1-action, we prove a version of the LeBrun-Simanca openness theorem and Arezzo-Pacard blow-up theorem.515Imperial College Londonhttp://ethos.bl.uk/OrderDetails.do?uin=uk.bl.ethos.700709http://hdl.handle.net/10044/1/43380Electronic Thesis or Dissertation |
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515 Sektnan, Lars Martin Poincaré type Kähler metrics and stability on toric varieties |
| description |
In this thesis we study the relationship between the existence of extremal Kähler metrics and stability. We introduce a space of symplectic potentials for toric manifolds, which we show gives metrics with mixed Poincaré type and cone angle singularities. We show uniqueness and that existence implies stability for extremal metrics arising from these potentials. For quadrilaterals, we give a computable criterion for stability in certain cases, giving a definite log-stable region for generic quadrilaterals. We use computational tools to find new examples of stable and unstable toric manifolds. For Poincaré type manifolds with an S1-action, we prove a version of the LeBrun-Simanca openness theorem and Arezzo-Pacard blow-up theorem. |
| author2 |
Donaldson, Simon |
| author_facet |
Donaldson, Simon Sektnan, Lars Martin |
| author |
Sektnan, Lars Martin |
| author_sort |
Sektnan, Lars Martin |
| title |
Poincaré type Kähler metrics and stability on toric varieties |
| title_short |
Poincaré type Kähler metrics and stability on toric varieties |
| title_full |
Poincaré type Kähler metrics and stability on toric varieties |
| title_fullStr |
Poincaré type Kähler metrics and stability on toric varieties |
| title_full_unstemmed |
Poincaré type Kähler metrics and stability on toric varieties |
| title_sort |
poincaré type kähler metrics and stability on toric varieties |
| publisher |
Imperial College London |
| publishDate |
2016 |
| url |
http://ethos.bl.uk/OrderDetails.do?uin=uk.bl.ethos.700709 |
| work_keys_str_mv |
AT sektnanlarsmartin poincaretypekahlermetricsandstabilityontoricvarieties |
| _version_ |
1718692128485277696 |