Geometria Diferencial
Grupo de pesquisa do Instituto de Matemática
Universidade Federal do Rio de Janeiro
Contato
email do grupo:
geometria-im [at] im [ponto] ufrj [ponto] br
Endereço:
Instituto de Matemática - UFRJ,
Av. Athos da Silveira Ramos 149,
Centro de Tecnologia - Bloco C,
Cidade Universitária - Ilha do Fundão,
Caixa Postal 68530,
21941-909 Rio de Janeiro,
RJ - BRASIL
Telephone: (+55) 21 2562 7036
Grupo de Pesquisa
Informações para alunos de pós-graduação
Informação importante sobre disciplinas regulares e provas de qualificação
Disciplinas de Pós Graduação em Geometria
Análise Geométrica 2021-1
Geometria Complexa 2020-2
Geometria Diferencial (mest) 2021-1 2020-1
Geometria Riemanniana 2021-2 2020-PLE
Geometria Simplética I
Integrabilidade e Simetria em Física 2021-1
Superfícies Imersas em Warped
Products de Dimensão Três 2021-1
Superfícies Mínimas
Superfícies de Riemann
Topologia Algébrica 2018-2
Topologia Diferencial
Preprints e publicações recentes
On the stability for constant higher mean curvature hypersurfaces in a Riemannian manifold, by Maria Fernanda Elbert and Barbara Nelli
Full Ellipsoid Embeddings and Toric Mutations, by Roger Casals and Renato Vianna
Geometry of symplectic flux and Lagrangian torus fibrations, by Egor Shelukhin, Dmitry Tonkonog and Renato Vianna
Infinitely many monotone Lagrangian tori in Del Pezzo surfaces, by Renato Vianna
Reference Bayesian analysis for hierachical models, by Thaís C. O. Fonseca, Helio S. Migon, Heudson Mirandola
Height estimates for H-surfaces in the warped product M\times_f\R, by Abigail Folha, Carlos Peñafiel, Walcy Santos
The SW(3/2,2) superconformal algebra via a Quantum Hamiltonian Reduction of osp(3|2), by Lázaro O. Rodríguez Díaz
Infinitely many exotic monotone Lagrangian tori in CP^2, by Renato Vianna
Equivariant stable sheaves and toric GIT, by Andrew Clarke, Carl Tipler, (Proc. Royal Soc. of Edinburgh A., 2022).
Constructing symplectomorphisms between symplectic torus quotients, by Hans-Christian Herbig, Ethan Lawler, Christopher Seaton
Hilbert series associated to symplectic quotients by $\operatorname{SU}_2$, by Hans-Christian Herbig, Daniel Herden, Christopher Seaton
On the structure of hypersurfaces in H^n x R with finite strong total curvature, by Maria Fernanda Elbert, Barbara Nelli ( Bull. London Math. Soc. 51, 2019)
Complete hypersurfaces in Euclidean spaces with strong finite total curvature, by Maria Fernanda Elbert , Manfredo do Carmo (Comm. in Anal. and Geom. 27 (6), 2019)
Explicit formulas in Lie theory, by Alejandro Cabrera, Ioan Marcut, Maria Amelia Salazar
A note on invariant constant curvature immersions in Minkowski space, by François Fillastre, Graham Smith
The Hilbert series of $\operatorname{SL}_2$-invariants, by Pedro de Carvalho Cayres Pinto, Hans-Christian Herbig, Daniel Herden, Christopher Seaton
Lie theory of multiplicative tensors, by Henrique Bursztyn, Thiago Drummond