TitleDifferential Geometry [electronic resource] : Proceedings of the 3rd International Symposium, held at Peรฑiscola, Spain, June 5-12, 1988 / edited by Francisco J. Carreras, Olga Gil-Medrano, Antonio M. Naveira
ImprintBerlin, Heidelberg : Springer Berlin Heidelberg, 1989
Connect tohttp://dx.doi.org/10.1007/BFb0086407
Descript VIII, 316 p. online resource

SUMMARY

This volume of proceedings contains selected and refereed articles - both surveys and original research articles - on geometric structures, global analysis, differential operators on manifolds, cohomology theories and other topics in differential geometry


CONTENT

Smooth toral actions on principal bundles and characteristic classes -- Integrable forms on iterated loop spaces and higher dimensional non abelian de Rham theory -- Mรฉtriques d'Einstein-Kรคhler -- Spherical finite type submanifolds.Applications -- Representing the super Virasoro algebra by meromorphic vectorfields on the graded Riemann sphere -- Algebraic characterizations by means of the curvature in contact geometry -- Some results on the normal subgroups of Diff? (Xร?+, rel Xร[0]) -- On volume elements on a non-compact manifold -- On codimension-one foliations -- Une application des algebres de Clifford -- Mรถbius geometry VI. characterization of the homogeneous tori -- Hypersurfaces of constant mean curvature -- Compactification and completion of Yang-Mills moduli spaces -- Rapid decay of eigenfunctions -- Differential invariants on the bundles of g-structures -- The eta invariant of even order operators -- Curvature of contact Riemannian three-manifolds with critical metrics -- On a linearizability condition for a three-web on a two-dimensional manifold -- Submanifolds with Euclidean complements -- Graded derivations of the algebra of differential forms associated with a connection -- Generalized symplectomorphisms -- Asymptotic behavior of the Yang-Mills gradient flow -- Some global properties of closed space curves -- Metrics of constant curvature on a sphere with two conical singularities


SUBJECT

  1. Mathematics
  2. Differential geometry
  3. Mathematics
  4. Differential Geometry