Add to ORKG1. Introduction. In recent years, there has been considerable interest in Oxford and elsewhere in the connections between Einstein's equations, the (anti-) self-dual Yang-Mills (SDYM) equations, and the theory of integrable systems. The common theme running through this work is that, to a greater or lesser extent, all three areas involve questions that can be addressed by twistor methods. In this paper, I shall review progress, with particular emphasis on the known and potential applications in relativity. Some of the results are well-established, others are more recent, and a few appear here for the first time
The equations governing anti-self-dual and Einstein-Weyl conformal geometries can be regarded as “ma...
The aim of this thesis is to construct Einstein metrics and Einstein-Weyl geometries explicitly main...
There is remarkable relation between self-dual Yang-Mills and self-dual Einstein gravity in four Euc...
Twistor theory is the remarkable mathematical framework that was discovered by Roger Penrose in the ...
The curved twistor theory is studied from the point of view of integrable systems. A twistor constru...
The equations governing anti-self-dual and Einstein-Weyl conformal geometries can be regarded as ‘ma...
We review aspects of twistor theory, its aims and achievements spanning the last five decades. In th...
Abstract. W algebras arise in the study of various nonlinear integrable systems such as: self-dual g...
In this thesis, we report on different aspects of integrability in supersymmetric gauge theories. Th...
The Einstein equations describing gravitational fields in vacuum are written as a compact exterior s...
International audienceThis paper establishes the relation between traditional results from the (Eucl...
International audienceThis paper establishes the relation between traditional results from the (Eucl...
The Kerr theorem is revisited as part of the twistor program in six dimensions. The relationship bet...
For the Yang-Mills Lagrangian of the twistor connection, an analog of the Palatini variational metho...
Abstract Many integrable systems can be reformulated as holomorphic vector bundles on twistor space....
The equations governing anti-self-dual and Einstein-Weyl conformal geometries can be regarded as “ma...
The aim of this thesis is to construct Einstein metrics and Einstein-Weyl geometries explicitly main...
There is remarkable relation between self-dual Yang-Mills and self-dual Einstein gravity in four Euc...
Twistor theory is the remarkable mathematical framework that was discovered by Roger Penrose in the ...
The curved twistor theory is studied from the point of view of integrable systems. A twistor constru...
The equations governing anti-self-dual and Einstein-Weyl conformal geometries can be regarded as ‘ma...
We review aspects of twistor theory, its aims and achievements spanning the last five decades. In th...
Abstract. W algebras arise in the study of various nonlinear integrable systems such as: self-dual g...
In this thesis, we report on different aspects of integrability in supersymmetric gauge theories. Th...
The Einstein equations describing gravitational fields in vacuum are written as a compact exterior s...
International audienceThis paper establishes the relation between traditional results from the (Eucl...
International audienceThis paper establishes the relation between traditional results from the (Eucl...
The Kerr theorem is revisited as part of the twistor program in six dimensions. The relationship bet...
For the Yang-Mills Lagrangian of the twistor connection, an analog of the Palatini variational metho...
Abstract Many integrable systems can be reformulated as holomorphic vector bundles on twistor space....
The equations governing anti-self-dual and Einstein-Weyl conformal geometries can be regarded as “ma...
The aim of this thesis is to construct Einstein metrics and Einstein-Weyl geometries explicitly main...
There is remarkable relation between self-dual Yang-Mills and self-dual Einstein gravity in four Euc...