On a projective conformal semi-symmetric connection

Abstract: In this paper we propose a projective conformal semi-symmetric connection and study its geometric and physical properties. The Schur's theorem of this connection is obtained.

“…Based on relations (4.9) and (4.14), we conclude that curvature tensor ∇ is conjugate symmetric (see [5]). From here we see that the connection Remark 4.1 In paper [24], the authors observed quarter-symmetric non-metric connection in the form…”

“…This connection was also studied in papers [4,5]. These papers motivated us to study the quarter-symmetric connection on the generalized Riemannian manifold in the following form…”

Quarter-symmetric non-metric connection

“…Based on relations (4.9) and (4.14), we conclude that curvature tensor ∇ is conjugate symmetric (see [5]). From here we see that the connection Remark 4.1 In paper [24], the authors observed quarter-symmetric non-metric connection in the form…”

“…This connection was also studied in papers [4,5]. These papers motivated us to study the quarter-symmetric connection on the generalized Riemannian manifold in the following form…”

Quarter-symmetric non-metric connection

“…Some other geometric object can be defined using curvature tensor, for example Ricci curvature tensor, scalar curvature, Weyl tensor, etc. In the articles [2,3,20], the curvature tensor was studied at various mappings and transformations (see also the monographs [4] and [7]).…”

Some New Identities for the Second Covariant Derivative of the Curvature Tensor

Concircularly semi-symmetric metric connection