CONFORMAL DIFFERENTIAL GEOMETRY - Q-CURVATURE AND CONFORMAL HOLONOMY
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CONFORMAL DIFFERENTIAL GEOMETRY - Q-CURVATURE AND CONFORMAL HOLONOMY

Conformal invariants (conformally invariant tensors, conformally covariant differential operators, conformal holonomy groups etc.) are of central significance in differential geometry and physics. Well-known examples of such operators are the Yamabe-, the Paneitz-, the Dirac- and the twistor operator. The aim of the seminar was to present the basic ideas and some of the recent developments around Q-curvature and conformal holonomy. The part on Q-curvature discusses its origin, its relevance in geometry, spectral theory and physics. Here the influence of ideas which have their origin in the AdS/CFT-correspondence becomes visible. The part on conformal holonomy describes recent classification results, its relation to Einstein metrics and to conformal Killing spinors, and related special geometries.
Editora: BIRKHAUSER
ISBN: 3764399082
ISBN13: 9783764399085
Edição: 1ª Edição - 2010
Número de Páginas: 164
Acabamento: PAPERBACK
por R$ 333,06 4x de R$ 83,27 sem juros