Özet
In this paper, Ricci curves in a 3-dimensional Weyl space W3 (g, T) are defined and it is shown that any 3-dimensional Chebyshev net formed by the three families of Ricci curves in a W3(g, T) having a definite metric and Ricci tensors is either a geodesic net or it consists of a geodesic subnet the members of which have vanishing second curvatures. In the case of an indefinite Ricci tensor, only one of the members of the geodesic subnet under consideration has a vanishing second curvature.
Orijinal dil | İngilizce |
---|---|
Sayfa (başlangıç-bitiş) | 350-358 |
Sayfa sayısı | 9 |
Dergi | Topology and its Applications |
Hacim | 153 |
Basın numarası | 2-3 SPEC. ISS. |
DOI'lar | |
Yayın durumu | Yayınlandı - 1 Eyl 2005 |