Maria Fernanda Elbert - CONECTA UFRJ

Maria Fernanda Elbert

Instituição:

Universidade Federal do Rio de Janeiro

Centro:

Centro de Ciências Matemáticas e da Natureza

Unidade:

Instituto de Matemática

Departamento:

Departamento de Matemática/Mat

Instituto Nacional de Matemática Pura e Aplicada
Matemática | Doutorado | 1993 - 1998

Instituto Nacional de Matemática Pura e Aplicada
Matemática | Mestrado | 1991 - 1992

Universidade Federal do Rio de Janeiro
Bacharelado em Matemática | Graduação | 1988 - 1991

Nenhum laboratório cadastrado

(40.00% artigos com DOI)

Titulo	DOI	Ano
On the structure of hypersurfaces in Hn×R with finite strong total curvature	10.1112/blms.12214	2019
Complete hypersurfaces in Euclidean spaces with finite strong total curvature	10.4310/CAG.2019.v27.n6.a3	2019
Constructions of $$H_r$$ H r -hypersurfaces, barriers and Alexandrov theorem in $$mathrm{I!H}^n imes mathrm{I!R}$$ I H n × I R	10.1007/s10231-014-0446-y	2015
Hypersurfaces with $${H_{r+1}}$$ H r + 1 = 0 in $${mathbb{H}^n imes mathbb{R}}$$ H n × R	10.1007/s00229-015-0794-y	2015
All solutions of the CMC-equation in $${mathbb{H}^n imesmathbb{R}}$$ invariant by parabolic screw motion	10.1007/s10231-012-0268-8	2014
Existence of vertical ends of mean curvature $1/2$ in $mathbb{H}^{2} ×mathbb{R}$	10.1090/S0002-9947-2011-05361-4	2012
Minimal Graphs in MxR		2008
Stable constant mean curvature hypersurfaces		2007
On stable complete hypersurfaces with vanishing r-mean curvature		2004
Stability of Hypersurfaces with vanishing r-mean curvatures in euclidian spaces		2003
Positive 2-mean curvature hypersurfaces in space forms		2002
On Complete Graphs with Negative r-Mean Curvature		2000
Topological structure of complete hypersurfaces in Rn+1 with Hr=0 and finite total curvature		1999
Stable Minimal Hypersurfaces in Euclidean Spaces		1998
On Complete Constant r-Mean Curvature Hypersurfaces in Space Forms		1997

Nenhum evento cadastrado