Author
Mohd Danish Siddiqi
Bio: Mohd Danish Siddiqi is an academic researcher from Jazan University. The author has contributed to research in topics: Mathematics & Manifold. The author has an hindex of 5, co-authored 26 publications receiving 70 citations.
Papers
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TL;DR: In this paper, the geometrical aspects of a perfect fluid spacetime in terms of conformal Ricci soliton and conformal η-Ricci solitons with torse-forming vector field were studied.
Abstract: In this paper, we studied the geometrical aspects of a perfect fluid spacetime in terms of conformal Ricci soliton and conformal η-Ricci soliton with torse-forming vector field ξ. Condition for the...
12 citations
24 Apr 2018
TL;DR: In this article, it was shown that a symmetric second order Covariant tensor in a δ-Lorentzian Trans Sasakian manifold is a constant multiple of metric tensors.
Abstract: The object of the present paper is to study the δ-Lorentzian Trans Sasakian manifolds admitting the conformal η-Ricci Solitons and gradient conformal Ricci soliton. It is shown that a symmetric second order covariant tensor in a δ-Lorentzian Trans Sasakian manifold is a constant multiple of metric tensor. Also an example of conformal η-Ricci soliton in 3-dimensional δ-Lorentzian Trans Sasakian manifold is provided in the region where δ-Lorentzian Trans Sasakian manifold expanding.
12 citations
Posted Content•
TL;DR: In this paper, the geometrical bearing on Riemannian submersions in terms of the Ricci-Yamabe solitons with the potential field was established.
Abstract: In this research article, we establish the geometrical bearing on Riemannian submersions in terms of $\eta$-Ricci-Yamabe Soliton with the potential field and giving the classification of any fiber of Riemannian submersion is an $\eta$-Ricci-Yamabe soliton, $\eta$-Ricci soliton and $\eta$-Yamabe soliton. We also discuss the various conditions for which the target manifold of Riemannian submersion is an $\eta$-Ricci-Yamabe soliton, $\eta$-Ricci soliton, $\eta$-Yamabe soliton and quasi-Yamabe soliton. In a particular case when the potential filed $V$ of the $\eta$-Ricci-Yamabe soliton is of gradient type, we derive a Laplacian equation and providing some examples of an $\eta$-Ricci-Yamabe soliton on a Riemannian submersion. Finally, we study harmonic aspect of $\eta$-Ricci-Yamabe soliton on Riemannian submersions and mention geometrical and physical effects of Ricci-Yamabe solitons.
12 citations
Journal Article•
TL;DR: In this paper, the integrability conditions of distribution on a Riemannian manifold with a quarter-symmetric non-metric connection were studied and a semi-invariant submanifolds of an almost $r$-contact manifold was derived.
Abstract: We consider a Kenmotsu manifold immersed in almost $r$-contact manifold admitting a quarter- symmetric non-metric connection and study semi-invariant submanifolds of an almost $r$-contact Kenmotsu manifold immersed in almost $r$-contact Riemannian manifold endowed with a quarter- symmetric non- metric connection. We also discuss the integrability conditions of distribution on Kenmotsu manifold.
10 citations
TL;DR: In this paper, a new class of submanifolds of a generalized quasi-Sasakian manifold, called skew semi-invariant sub-manifold, was studied, and the equivalence relations for the skew semirefariant subsumption of a semi-SASAKian manifold were given.
Abstract: In the present paper, we study a new class of submanifolds of a generalized Quasi-Sasakian manifold, called skew semi-invariant submanifold. We obtain integrability conditions of the distributions on a skew semi-invariant submanifold and also find the condition for a skew semi-invariant submanifold of a generalized Quasi-Sasakian manifold to be mixed totally geodesic. Also it is shown that a skew semi-invariant submanifold of a generalized Quasi-Sasakian manifold will be anti-invariant if and only if $A_{\xi}=0$; and the submanifold will be skew semi-invariant submanifold if $
abla w=0$. The equivalence relations for the skew semi-invariant submanifold of a generalized Quasi-Sasakian manifold are given. Furthermore, we have proved that a skew semi-invariant $\xi^\perp$-submanifold of a normal almost contact metric manifold and a generalized Quasi-Sasakian manifold with non-trivial invariant distribution is $CR$-manifold. An example of dimension 5 is given to show that a skew semi-invariant $\xi^\perp$ submanifold is a $CR$-structure on the manifold.
8 citations
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01 Jan 2007
TL;DR: The condition for the curvature of a statistical manifold to admit a kind of standard hypersurface is given in this article as a first step of the statistical submanifold theory.
Abstract: The condition for the curvature of a statistical manifold
to admit a kind of standard hypersurface is given
as a first step of the statistical submanifold theory.
A complex version of the notion of statistical structures
is also introduced.
79 citations
TL;DR: In this article , the authors consider the class of Ricci tensor tensors that admit conformal Ricci solitons on $ \epsilon $-Kenmotsu manifolds and present a characterization of the potential function.
Abstract: The present paper is to deliberate the class of $ \epsilon $-Kenmotsu manifolds which admits conformal $ \eta $-Ricci soliton. Here, we study some special types of Ricci tensor in connection with the conformal $ \eta $-Ricci soliton of $ \epsilon $-Kenmotsu manifolds. Moving further, we investigate some curvature conditions admitting conformal $ \eta $-Ricci solitons on $ \epsilon $-Kenmotsu manifolds. Next, we consider gradient conformal $ \eta $-Ricci solitons and we present a characterization of the potential function. Finally, we develop an illustrative example for the existence of conformal $ \eta $-Ricci soliton on $ \epsilon $-Kenmotsu manifold.
43 citations
TL;DR: In this paper , it was shown that if an η \eta -Einstein para-Kenmotsu manifold admits a conformal Ricci almost soliton and the Reeb vector field leaves the scalar curvature invariant then it is Einstein.
Abstract: Abstract We prove that if an η \eta -Einstein para-Kenmotsu manifold admits a conformal η \eta -Ricci soliton then it is Einstein. Next, we proved that a para-Kenmotsu metric as a conformal η \eta -Ricci soliton is Einstein if its potential vector field V V is infinitesimal paracontact transformation or collinear with the Reeb vector field. Furthermore, we prove that if a para-Kenmotsu manifold admits a gradient conformal η \eta -Ricci almost soliton and the Reeb vector field leaves the scalar curvature invariant then it is Einstein. We also construct an example of para-Kenmotsu manifold that admits conformal η \eta -Ricci soliton and satisfy our results. We also have studied conformal η \eta -Ricci soliton in three-dimensional para-cosymplectic manifolds.
20 citations
TL;DR: The conditions for *-Conformal ∆-Ricci soliton on 5-dimensional Sasakian manifolds have been obtained in this paper, where the curvature properties of these manifold admit Ricci solitons.
Abstract: In this paper we study *-Conformal {\eta}-Ricci soliton on Sasakian manifolds. Here, we discuss some curvature properties on Sasakian manifold admitting *-Conformal {\eta}-Ricci soliton. We obtain some significant results on *-Conformal {\eta}-Ricci soliton in Sasakian manifolds satisfying R({\xi},X).S = 0, S({\xi},X).R = 0, {\overline}P({\xi},X).S = 0, where {\overline}P is Pseudo-projective curvature tensor.The conditions for *-Conformal {\eta}-Ricci soliton on {\Phi}-conharmonically flat and {\Phi}-projectively flat Sasakian manifolds have been obtained in this article. Lastly we give an example of 5-dimensional Sasakian manifolds satisfying *-Conformal {\eta}-Ricci soliton.
13 citations