Manifold
theory is an important topic in differential geometry. Riemannian manifolds are
a wide class of differentiable manifolds.
Riemannian manifolds consist of two fundamental class, as contact
manifolds and complex manifolds. The notion of globally framed metric
Almost
dimension to
Riemannian manifolds with respect to some intrinsic and extrinsic tools as well
as all sciences. Moreover, symmetric manifolds play an important role in
differential geometry. There are a lot of symmetry type for Riemannian
manifolds with respect to different arguments. Under these considerations,
in the present paper we study some
symmetry conditions on almost
and sufficient conditions to characterize of their structures. Firstly, we prove that
the existence of weakly symmetric and weakly Ricci symmetric almost
every
some necessary and sufficient condition for a
-Einstein Manifold -Ricci Symmetric Manifolds Almost -Manifold Globally Framed Metric -Manifold -Structure Weakly Symmetric Manifold
Journal Section | Articles |
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Authors | |
Publication Date | September 30, 2017 |
Published in Issue | Year 2017 Volume: 13 Issue: 3 |