On complete Yamabe solitons

2018 ◽  
Vol 18 (1) ◽  
pp. 101-104 ◽  
Author(s):  
B. Bidabad ◽  
M. Yar Ahmadi
Keyword(s):  
Fundamental Group ◽  
Scalar Curvature ◽  
Sphere Bundle ◽  
Finite Fundamental Group ◽  
Yamabe Solitons ◽  
Yamabe Soliton

AbstractIn this paper we study an extension of Yamabe solitons for inequalities. We show that a Riemannian complete non-compact shrinking Yamabe soliton (M,g,V,λ) has finite fundamental group, provided that the scalar curvature is strictly bounded above byλ. Furthermore, an instance of illustrating the sharpness of this inequality is given. We also mention that the fundamental group of the sphere bundleSMis finite.

Conformal Geometry Solitons

2012 ◽  
Vol 472-475 ◽  
pp. 123-126
Author(s):  
Rong Rong Cao ◽  
Xiang Gao
Keyword(s):  
Scalar Curvature ◽  
Compact Manifold ◽  
Hilbert Function ◽  
Conformal Geometry ◽  
Constant Scalar Curvature ◽  
Yamabe Flow ◽  
Noncompact Manifolds ◽  
Monotone Formula ◽  
Yamabe Solitons ◽  
Yamabe Soliton

In this paper, we deal with a generalization of the Yamabe flow named conformal geometry flow. Firstly we derive a monotone formula of the Einstein-Hilbert functional under the conformal geometry flow. Then we prove the properties that the conformal geometry solitons and conformal geometry breather both have constant scalar curvature at each time by using the modified Einstein-Hilbert function. Finally we present some properties of Yamabe solitons in compact manifold and noncompact manifolds through the equation of Yamabe soliton.

Yamabe solitons and gradient Yamabe solitons on three-dimensional N(k)-contact manifolds

2020 ◽  
Vol 17 (12) ◽  
pp. 2050177
Author(s):  
Young Jin Suh ◽  
Uday Chand De
Keyword(s):  
Vector Field ◽  
Scalar Curvature ◽  
Three Dimensional ◽  
Constant Scalar Curvature ◽  
Infinitesimal Transformation ◽  
Contact Metric Manifold ◽  
Contact Manifolds ◽  
Flow Vector ◽  
Yamabe Solitons ◽  
Yamabe Soliton

If a three-dimensional [Formula: see text]-contact metric manifold [Formula: see text] admits a Yamabe soliton of type [Formula: see text], then the manifold has a constant scalar curvature and the flow vector field [Formula: see text] is Killing. Furthermore, either [Formula: see text] has a constant curvature [Formula: see text] or the flow vector field [Formula: see text] is a strict contact infinitesimal transformation. Also, we prove that if the metric of a three-dimensional [Formula: see text]-contact metric manifold [Formula: see text] admits a gradient Yamabe soliton, then either the manifold is flat or the scalar curvature is constant. Moreover, either the potential function is constant or the manifold is of constant sectional curvature [Formula: see text]. Finally, we have given an example to verify our result.

On Kenmotsu manifolds admitting η-Ricci-Yamabe solitons

2021 ◽  
pp. 2150189
Author(s):  
Halil İbrahim Yoldaş
Keyword(s):  
Scalar Curvature ◽  
Constant Scalar Curvature ◽  
Kenmotsu Manifold ◽  
Kenmotsu Manifolds ◽  
Yamabe Solitons ◽  
Yamabe Soliton

The objective of this paper is to deal with Kenmotsu manifolds admitting [Formula: see text]-Ricci-Yamabe solitons. First, it is proved that if a Kenmotsu manifold [Formula: see text] which admits an [Formula: see text]-Ricci-Yamabe soliton, then the manifold [Formula: see text] is Einstein and is of constant scalar curvature. Then, some important characterizations, which classify Kenmotsu manifolds admitting such solitons, are obtained and an example given which supports our results.

Yamabe solitons on 3-dimensional contact metric manifolds with Qφ = φQ

2019 ◽  
Vol 16 (03) ◽  
pp. 1950039 ◽  
Author(s):  
V. Venkatesha ◽  
Devaraja Mallesha Naik
Keyword(s):  
Vector Field ◽  
Scalar Curvature ◽  
Constant Scalar Curvature ◽  
Sasakian Manifold ◽  
Contact Metric Manifold ◽  
Reeb Vector Field ◽  
3 Dimensional ◽  
Flow Vector ◽  
Contact Metric Manifolds ◽  
Yamabe Soliton

If [Formula: see text] is a 3-dimensional contact metric manifold such that [Formula: see text] which admits a Yamabe soliton [Formula: see text] with the flow vector field [Formula: see text] pointwise collinear with the Reeb vector field [Formula: see text], then we show that the scalar curvature is constant and the manifold is Sasakian. Moreover, we prove that if [Formula: see text] is endowed with a Yamabe soliton [Formula: see text], then either [Formula: see text] is flat or it has constant scalar curvature and the flow vector field [Formula: see text] is Killing. Furthermore, we show that if [Formula: see text] is non-flat, then either [Formula: see text] is a Sasakian manifold of constant curvature [Formula: see text] or [Formula: see text] is an infinitesimal automorphism of the contact metric structure on [Formula: see text].

Classifications of quotion Yamabe solitons on Euclidean submanifolds with concurrent vector fields

2021 ◽  
pp. 2150103
Author(s):  
Fatemah Mofarreh ◽  
Akram Ali ◽  
Nasser Bin Turki ◽  
Rifaqat Ali
Keyword(s):  
Euclidean Space ◽  
Vector Fields ◽  
Yamabe Solitons ◽  
Euclidean Submanifolds ◽  
Yamabe Soliton

The aim of this paper is to obtain some results for quotion Yamabe solitons with concurrent vector fields. We prove quotion Yamabe soliton [Formula: see text] on a hypersurface in Euclidean space [Formula: see text] contained either in a hyperplane or in a sphere [Formula: see text].

scholarly journals On macroscopic dimension of non-spin 4-manifolds

2020 ◽  
pp. 1-10
Author(s):  
Michelle Daher ◽  
Alexander Dranishnikov
Keyword(s):  
Fundamental Group ◽  
Universal Covering ◽  
Residually Finite ◽  
Finite Fundamental Group

We prove that for 4-manifolds [Formula: see text] with residually finite fundamental group and non-spin universal covering [Formula: see text], the inequality [Formula: see text] implies the inequality [Formula: see text]. This allows us to complete the proof of Gromov’s Conjecture for 4-manifolds with abelian fundamental group.

scholarly journals Surfaces with $K^2 \lt 3\chi$ and finite fundamental group

2007 ◽  
Vol 14 (6) ◽  
pp. 1081-1098 ◽  
Author(s):  
Ciro Ciliberto ◽  
Margarida Mendes Lopes ◽  
Rita Pardini
Keyword(s):  
Fundamental Group ◽  
Finite Fundamental Group
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