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|Title:||Some Applications of Variational Calculus in Hermitian Geometry||Contributor(s):||Harris, A (author)||Publication Date:||2002||Handle Link:||https://hdl.handle.net/1959.11/353||Abstract:||Variational methods have long been regarded as the mathematical foundation of both classical and quantum mechanics, and continue to supply much of the impetus of modern symplectic topology and geometry. Their application in Hermitian geometry is a more recent development, though of comparable importance. The following partial survey will set out to expose their role specifically on the theory of Hermitian-Einstein vector bundles, and in those aspects of conformal field theory which involve deformations of complex structure.||Publication Type:||Book Chapter||Source of Publication:||Geometric Analysis and Applications to Quantum Field Theory, p. 95-117||Publisher:||Birkhauser||Place of Publication:||New York||ISBN:||0817642870||Field of Research (FOR):||010111 Real and Complex Functions (incl Several Variables)||HERDC Category Description:||B1 Chapter in a Scholarly Book||Other Links:||http://www.springer.com/birkhauser?SGWID=0-40290-0-0-0
|Series Name:||Progress in Mathematics||Series Number :||205||Statistics to Oct 2018:||Visitors: 133
|Appears in Collections:||Book Chapter|
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