Some notes on $LP$-Sasakian Manifolds with Generalized Symmetric Metric Connection

TL;DR

This paper explores generalized symmetric metric connections on Lorentzian para-Sasakian manifolds, deriving tensor relations and examining $CR$-submanifolds with these connections to extend geometric understanding.

Contribution

Introduces a new class of generalized symmetric metric connections on Lorentzian para-Sasakian manifolds and investigates their properties and implications for $CR$-submanifolds.

Findings

Derived tensor relations involving curvature and Ricci tensors.

Established properties of Ricci semi-symmetric manifolds.

Proved new results on $CR$-submanifolds with generalized symmetric metric connections.

Abstract

The present study initially identify the generalized symmetric connections of type $(\alpha,\beta)$, which can be regarded as more generalized forms of quarter and semi-symmetric connections. The quarter and semi-symmetric connections are obtained respectively when $(\alpha,\beta)=(1,0)$ and $(\alpha,\beta)=(0,1)$. Taking that into account, a new generalized symmetric metric connection is attained on Lorentzian para-Sasakian manifolds. In compliance with this connection, some results are obtained through calculation of tensors belonging to Lorentzian para-Sasakian manifold involving curvature tensor, Ricci tensor and Ricci semi-symmetric manifolds. Finally, we consider $CR$-submanifolds admitting a generalized symmetric metric connection and prove many interesting results.