Áurea Quintino


Departamento de Matemática

Sala/Gabinete 6.2.02
Ext. Principal 26201
Telefone Direto
Email amquintino@ciencias.ulisboa.pt



Scientific Interests

Integrable systems in Riemannian and Conformal Geometry, particularly Willmore surfaces (possibly with a constraint) and constant mean curvature surfaces.

PhD Thesis: "Constrained Willmore Surfaces: Symmetries of a Moebius Invariant Integrable System", available at https://arxiv.org/pdf/0912.5402v2.pdf.

Publicações selecionadas
  • Constrained Willmore Surfaces: Symmetries of a Moebius Invariant Integrable System, London Mathematical Society Lecture Note Series, Cambridge University Press, ISBN: 9781108794428 (to appear).
  • Transformations of generalized harmonic bundles and constrained Willmore surfaces, Willmore Energy and Willmore Conjecture, Chapman & Hall/CRC Monographs and Research Notes in Mathematics, CRC Press, Taylor and Francis Group, Boca Raton, Florida, ISBN: 978-1-4987-4463-8, 9-47 (2017).
  • Dressing transformations of constrained Willmore surfaces, with F. E. Burstall, Communications in Analysis and Geometry 22, 469-518 (2014).
  • Darboux transforms and simple factor dressing of constant mean curvature surfaces, with F. E. Burstall, J. F. Dorfmeister and K. Leschke, manuscripta mathematica 140, 213-236 (2013).
  • Spectral deformation and Baecklund transformation of constrained Willmore surfaces, Differential Geometry and its Applications 29, no. suppl. 1, S261-S270 (2011).

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