TENSORIAL CURVATURE AND D-DIFFERENTIATION PART II: "PRINCIPAL" KIND AND EINSTEIN–MAXWELL THEORY
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Publication:3503081
DOI10.1142/S0219887807002326zbMath1147.53014MaRDI QIDQ3503081
Michael A. Vandyck, Donal J. Hurley
Publication date: 20 May 2008
Published in: International Journal of Geometric Methods in Modern Physics (Search for Journal in Brave)
Differentiable manifolds, foundations (58A05) Other connections (53B15) Methods of local Riemannian geometry (53B21)
Related Items (8)
TENSORIAL CURVATURE AND D-DIFFERENTIATION PART I: "COMMUTATIVE" KIND ⋮ A NOTE ON THE GENERAL RELATIONSHIP BETWEEN D-DIFFERENTIATION AND COVARIANT DIFFERENTIATION ⋮ Spectral geometry of eta-Einstein Sasakian manifolds ⋮ A geometrical framework for dyons in the presence of the dilaton and the axion in four dimensions ⋮ A NEW GEOMETRICAL FRAMEWORK FOR THE DE BROGLIE–BOHM QUANTUM THEORY ⋮ \({\mathfrak D}\)-differentiation in Hilbert space and the structure of quantum mechanics ⋮ η-EINSTEIN TANGENT SPHERE BUNDLES OF CONSTANT RADII ⋮ CRITICAL HERMITIAN STRUCTURES ON THE PRODUCT OF SASAKIAN MANIFOLDS
Cites Work
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- A unified framework for Lie and covariant differentiation (with application to tensor fields)
- TENSORIAL CURVATURE AND D-DIFFERENTIATION PART I: "COMMUTATIVE" KIND
- An application ofD-differentiation to solid-state physics
- Topics in differential geometry. A new approach using \(D\)-differentiation
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