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From conformal infinity to equations of motion: conserved quantities in general relativity. [PDF]
Philos Trans A Math Phys Eng SciPenrose R.
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From Quantum Curves to Topological String Partition Functions II. [PDF]
Ann Henri PoincareComan I, Longhi P, Teschner J.
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QCD and strongly coupled gauge theories: challenges and perspectives. [PDF]
Eur Phys J C Part Fields, 2014 Brambilla N +49 more
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Hermitian Structures on Twistor Spaces
Annals of Global Analysis and Geometry, 1998Let \((M,g)\) be an oriented self-dual compact Einstein 4-manifold \((M,g)\) and \(Z\) its twistor space with the standard Riemannian metric \(h_t\) which depends on the parameter \(t>0\). It is well-known that \(Z\) admits a canonical complex structure \(J_Z\) which is orthogonal with respect to any standard metric \(h_t\), \(t>0\).
Apostolov, V. +2 more
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Journal of Geometry and Physics, 1986
Let (M,\(\omega)\) be an almost symplectic manifold and \({\mathcal T}(M,\omega)\) its symplectic twistor space, i.e. the bundle of the compatible complex structures of its tangent spaces, as considered by \textit{M. Dubois-Violette} [Mathématique et physique, Sémin. Éc. Norm. Supér., Paris 1979-1982, Prog. Math.
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Let (M,\(\omega)\) be an almost symplectic manifold and \({\mathcal T}(M,\omega)\) its symplectic twistor space, i.e. the bundle of the compatible complex structures of its tangent spaces, as considered by \textit{M. Dubois-Violette} [Mathématique et physique, Sémin. Éc. Norm. Supér., Paris 1979-1982, Prog. Math.
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G-structures of twistor type and their twistor spaces
Journal of Geometry and Physics, 1993zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Alekseevsky, D. V., Graev, M. M.
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