ALMOST CONTACT B-METRIC HYPERSURFACES OF KAEHLERIAN MANIFOLDS WITH B-METRIC

@inproceedings{Manev2001ALMOSTCB,
  title={ALMOST CONTACT B-METRIC HYPERSURFACES OF KAEHLERIAN MANIFOLDS WITH B-METRIC},
  author={Mancho Manev},
  year={2001}
}
The geometry of almost complex B-metric manifolds is determined by the action of the almost complex structure as an antiisometry in each tangent fibre. The basic classes of these even dimensional manifolds are given in . The special class W0 in this classification is the class of the Kaehlerian manifolds with B-metric, where the almost complex structure is parallel with respect to the Levi-Civita connection of the B-metric. This class is contained in each other class. Examples of W0-manifolds… CONTINUE READING

Citations

Publications citing this paper.
SHOWING 1-10 OF 11 CITATIONS

References

Publications referenced by this paper.
SHOWING 1-7 OF 7 REFERENCES

Gribachev, Submanifolds of some almost contact manifolds with B-metric with codimension two

K. G. Nakova
  • I, Math. Balkanica (N.S.),
  • 1998

Gribachev, Conformally invariant tensors on almost contact manifolds with B-metric

K. M. Manev
  • Serdica - Bulg. Math. Publ.,
  • 1994

Gribachev, Almost contact manifolds with B-metric, Math

G. Ganchev, K. V. Mihova
  • Balkanica (N.S.),
  • 1993

Properties of curvatures tensors on almost contact manifolds with B-metric

M. Manev
  • Proc. of Jubilee Sci. Session of V. Levsky Higher Military school, V. Tarnovo,
  • 1993

Curvature properties of Kaehlerian manifolds with B-metric

A. Borisov, G. Ganchev
  • Math. and Educ. in Math., Proc. of 14-th Spring Conference of UBM, Sunny Beach,
  • 1985
VIEW 1 EXCERPT

On a class of four-dimensional A-spaces (in Russian), Izv. Vyssh

A. P. Norden
  • Uchebn. Zaved. Mat.,
  • 1960