Liouville type theorems and stability of ΦS, p-harmonic maps. (November 2021)
- Record Type:
- Journal Article
- Title:
- Liouville type theorems and stability of ΦS, p-harmonic maps. (November 2021)
- Main Title:
- Liouville type theorems and stability of ΦS, p-harmonic maps
- Authors:
- Feng, Shuxiang
Han, Yingbo
Wei, Shihshu Walter - Abstract:
- Abstract: In this paper, we first raise the following question: can we obtain the p -stress energy tensor S p that is associated with the p -energy functional E p vanishes under some interesting conditions? This motivates us to introduce the notions of the Φ S, p -energy density e Φ S, p ( u ), and the Φ S, p -energy functional E Φ S, p ( u ) of a map u : M → N, that are related to the p -stress energy tensor S p of a smooth map u between two Riemannian manifolds M and N . We derive the first variation formula of type I and type II, and the second variation formula for the Φ S, p -energy functional E Φ S, p ( u ) . We also introduce the stress energy tensor S Φ S, p for the Φ S, p -energy functional E Φ S, p, the notions of Φ S, p -harmonic maps, and stable Φ S, p -harmonic maps between Riemannian manifolds. Then we obtain some properties for weakly conformal Φ S, p -harmonic maps and horizontally conformal Φ S, p -harmonic maps, and prove some Liouville type results for Φ S, p -harmonic maps from some complete Riemannian manifolds under various conditions on the Hessian of the distance function and the asymptotic behavior of the map at infinity. By an extrinsic average variational method in the calculus of variations (Wei; 1989, 1983), we find Φ S, p -SSU manifolds and prove that any stable Φ S, p -harmonic map from or into a compact Φ S, p -SSU manifold (to or from a compact manifold) must be constant (cf. Theorems 5.1 and 6.1). We further prove that the homotopic class ofAbstract: In this paper, we first raise the following question: can we obtain the p -stress energy tensor S p that is associated with the p -energy functional E p vanishes under some interesting conditions? This motivates us to introduce the notions of the Φ S, p -energy density e Φ S, p ( u ), and the Φ S, p -energy functional E Φ S, p ( u ) of a map u : M → N, that are related to the p -stress energy tensor S p of a smooth map u between two Riemannian manifolds M and N . We derive the first variation formula of type I and type II, and the second variation formula for the Φ S, p -energy functional E Φ S, p ( u ) . We also introduce the stress energy tensor S Φ S, p for the Φ S, p -energy functional E Φ S, p, the notions of Φ S, p -harmonic maps, and stable Φ S, p -harmonic maps between Riemannian manifolds. Then we obtain some properties for weakly conformal Φ S, p -harmonic maps and horizontally conformal Φ S, p -harmonic maps, and prove some Liouville type results for Φ S, p -harmonic maps from some complete Riemannian manifolds under various conditions on the Hessian of the distance function and the asymptotic behavior of the map at infinity. By an extrinsic average variational method in the calculus of variations (Wei; 1989, 1983), we find Φ S, p -SSU manifolds and prove that any stable Φ S, p -harmonic map from or into a compact Φ S, p -SSU manifold (to or from a compact manifold) must be constant (cf. Theorems 5.1 and 6.1). We further prove that the homotopic class of any map from a compact manifold into a compact Φ S, p -SSU manifold contains elements of arbitrarily small Φ S, p -energy, and the homotopic class of any map from a compact Φ S, p -SSU manifold into a manifold contains elements of arbitrarily small Φ S, p -energy (cf. Theorems 7.1 and 8.2). As immediate consequences, we give a simple and direct proof of the above Theorems 5.1 and 6.1. These Theorems 5.1, 6.1, 7.1 and 8.2 give rise to the concept of Φ S, p -strongly unstable ( Φ S, p -SU) manifolds, extending the notions of strongly unstable (SU), p -strongly unstable ( p -SU), Φ -strongly unstable ( Φ -SU) and Φ S -strongly unstable ( Φ S -SU) manifolds (cf. Howard and Wei, 1986; Wei and Yau, 1994; Wei, 1998; Han and Wei, 2019; Feng et al., 2021). Hence, superstrongly unstable (SSU), p -superstrongly unstable ( p -SSU), Φ -superstrongly unstable ( Φ -SSU) and Φ S superstrongly unstable ( Φ S -SSU) manifolds are strongly unstable (SU), p -strongly unstable ( p -SU), Φ -strongly unstable ( Φ -SU) and Φ S -strongly unstable ( Φ S -SU) manifolds respectively, and enjoy their wonderful properties. We also introduce the concepts of Φ S, p -unstable ( Φ S, p -U) manifold and establish a link of Φ S, p -SSU manifold to p -SSU manifold and topology. Compact Φ S, p -SSU homogeneous spaces are studied. … (more)
- Is Part Of:
- Nonlinear analysis. Volume 212(2021)
- Journal:
- Nonlinear analysis
- Issue:
- Volume 212(2021)
- Issue Display:
- Volume 212, Issue 2021 (2021)
- Year:
- 2021
- Volume:
- 212
- Issue:
- 2021
- Issue Sort Value:
- 2021-0212-2021-0000
- Page Start:
- Page End:
- Publication Date:
- 2021-11
- Subjects:
- 58E20 -- 53C21 -- 53C25
ϕS, p-harmonic map -- Liouville type results -- Variation formula -- ϕS, p-SSU manifolds
Mathematical analysis -- Periodicals
Functional analysis -- Periodicals
Nonlinear theories -- Periodicals
Analyse mathématique -- Périodiques
Analyse fonctionnelle -- Périodiques
Théories non linéaires -- Périodiques
Functional analysis
Mathematical analysis
Nonlinear theories
Periodicals
Electronic journals
515.7248 - Journal URLs:
- http://www.sciencedirect.com/science/journal/0362546X ↗
http://www.elsevier.com/journals ↗ - DOI:
- 10.1016/j.na.2021.112468 ↗
- Languages:
- English
- ISSNs:
- 0362-546X
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- Legaldeposit
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- Available online (eLD content is only available in our Reading Rooms) ↗
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- British Library DSC - 6117.316500
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