Add to ORKGThe equations governing anti-self-dual and Einstein-Weyl conformal geometries can be regarded as “master dispersionless systems” in four and three dimensions, respectively. Their integrability by twistor methods has been established by Penrose and Hitchin. In this note, we present, in specially adapted coordinate systems, explicit forms of the corresponding equations and their Lax pairs. In particular, we demonstrate that any Lorentzian Einstein-Weyl structure is locally given by a solution to the Manakov-Santini system, and we find a system of two coupled third-order scalar partial differential equations for a general anti-self-dual conformal structure in neutral signature
Abstract: We discuss the twistor correspondence between path geometries in three dimensions with van...
instein manifolds with positive scalar curvature and continuous isometries are known to have Einstei...
Abstract: We explore the conformal geometric structures of a pair of second-order partial-differenti...
The equations governing anti-self-dual and Einstein-Weyl conformal geometries can be regarded as ‘ma...
For several classes of second order dispersionless PDEs, we show that the symbols of their formal li...
AbstractWe consider four (real or complex) dimensional hyper-Kähler metrics with a conformal symmetr...
Einstein–Weyl geometry is a triple (D,g,ω) where D is a symmetric connection, [g] is a conformal str...
Einstein–Weyl geometry is a triple (D,g,ω) where D is a symmetric connection, [g] is a conformal str...
It is shown that Einstein-Weyl (EW) equations in 2+1 dimensions contain the dispersionless Kadomtse...
summary:In the joint paper of the author with {\it K. P. Tod} [J. Reine Angew. Math. 491, 183-198 (1...
A longstanding open problem in mathematical physics has been that of finding an action principle for...
summary:In the joint paper of the author with {\it K. P. Tod} [J. Reine Angew. Math. 491, 183-198 (1...
Einstein–Weyl geometry is a triple (D,g,ω) where D is a symmetric connection, [g] is a conformal str...
. We study the Jones and Tod correspondence between selfdual conformal 4-manifolds with a conformal ...
We show that the Teukolsky connection, which defines generalized wave operators governing the behavi...
Abstract: We discuss the twistor correspondence between path geometries in three dimensions with van...
instein manifolds with positive scalar curvature and continuous isometries are known to have Einstei...
Abstract: We explore the conformal geometric structures of a pair of second-order partial-differenti...
The equations governing anti-self-dual and Einstein-Weyl conformal geometries can be regarded as ‘ma...
For several classes of second order dispersionless PDEs, we show that the symbols of their formal li...
AbstractWe consider four (real or complex) dimensional hyper-Kähler metrics with a conformal symmetr...
Einstein–Weyl geometry is a triple (D,g,ω) where D is a symmetric connection, [g] is a conformal str...
Einstein–Weyl geometry is a triple (D,g,ω) where D is a symmetric connection, [g] is a conformal str...
It is shown that Einstein-Weyl (EW) equations in 2+1 dimensions contain the dispersionless Kadomtse...
summary:In the joint paper of the author with {\it K. P. Tod} [J. Reine Angew. Math. 491, 183-198 (1...
A longstanding open problem in mathematical physics has been that of finding an action principle for...
summary:In the joint paper of the author with {\it K. P. Tod} [J. Reine Angew. Math. 491, 183-198 (1...
Einstein–Weyl geometry is a triple (D,g,ω) where D is a symmetric connection, [g] is a conformal str...
. We study the Jones and Tod correspondence between selfdual conformal 4-manifolds with a conformal ...
We show that the Teukolsky connection, which defines generalized wave operators governing the behavi...
Abstract: We discuss the twistor correspondence between path geometries in three dimensions with van...
instein manifolds with positive scalar curvature and continuous isometries are known to have Einstei...
Abstract: We explore the conformal geometric structures of a pair of second-order partial-differenti...