Genericity of bumpy metrics, bifurcation and stability in free boundary CMC hypersurfaces

Cárdenas, Carlos Wilson Rodríguez

doi:10.11606/T.45.2019.tde-15022019-111803

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DOI

https://doi.org/10.11606/T.45.2019.tde-15022019-111803

Document

Doctoral Thesis

Author

Cárdenas, Carlos Wilson Rodríguez (Catálogo USP)

Full name

Carlos Wilson Rodríguez Cárdenas

E-mail

Institute/School/College

Instituto de Matemática e Estatística

Knowledge Area

Mathematics

Date of Defense

2018-12-03

Published

São Paulo, 2018

Supervisor

Piccione, Paolo (Catálogo USP)

Committee

Piccione, Paolo (President)
Earp, Henrique Nogueira de Sá
Manfio, Fernando
Mossa, Roberto
Siciliano, Gaetano

Title in English

Genericity of bumpy metrics, bifurcation and stability in free boundary CMC hypersurfaces

Keywords in English

Bifurcation
Bumpy metrics
Constant mean curvature
Free boundary
Jacobi operator
Stability

Abstract in English

In this thesis we prove the genericity of the set of metrics on a manifold with boundary M^{n+1}, such that all free boundary constant mean curvature (CMC) embeddings \varphi: \Sigma^n \to M^{n+1}, being \Sigma a manifold with boundary, are non-degenerate (Bumpy Metrics), (Theorem 2.4.1). We also give sufficient conditions to obtain a free boundary CMC deformation of a CMC inmersion (Theorems 3.2.1 and 3.2.2), and a stability criterion for this type of immersions (Theorem 3.3.3 and Corollary 3.3.5). In addition, given a one-parametric family, {\varphi _t : \Sigma \to M} , of free boundary CMC immersions, we give criteria for the existence of smooth bifurcated branches of free boundary CMC immersions for the family {\varphi_t}, via the implicit function theorem when the kernel of the Jacobi operator J is non-trivial, (Theorems 4.2.3 and 4.3.2), and we study stability and instability problems for hypersurfaces in this bifurcated branches (Theorems 5.3.1 and 5.3.3).

Title in Portuguese

Genericidade das métricas bumpy, bifurcação e estabilidade em hipersuperfícies de CMC e fronteira livre

Keywords in Portuguese

Bifurcação.
Curvatura Média Constante
Estabilidade
Fronteira Livre
Métricas Bumpy
Operador de Jacobi

Abstract in Portuguese

Nesta tese, provamos a genericidade do conjunto de métricas em uma variedade com fronteira M^{n+1}, de modo que todos os mergulhos de curvatura média constante (CMC) e fronteira livre \varphi : \Sigma^n \to M^{n+1}, sendo \Sigma uma variedade com fronteira, sejam não-degenerados (Métricas Bumpy), (Teorema 2.4.1). Nós também fornecemos condições suficientes para obter uma deformação CMC e fronteira livre de uma imersão CMC (Teoremas 3.2.1 and 3.2.2), e um critério de estabilidade para este tipo de imersões (Teorema 3.3.3 and Corolario 3.3.5). Além disso, dada uma família 1-paramétrica, {\varphi _t : \Sigma \to M} , de imersões de CMC e fronteira livre, damos os critérios para a existência de ramos de bifurcação suaves de imersões CMC e fronteira livre para a familia {\varphi_t}, por meio de o teorema da função implícita quando o kernel do operador Jacobi J é não-trivial, (Teoremas 4.2.3 and 4.3.2), e estudamos o problema da estabilidade e instabilidade para hipersuperfícies em naqueles ramos de bifurcação (Teoremas 5.3.1 and 5.3.3).

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Publishing Date

2019-03-26

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