Áurea Quintino
Áurea Quintino
Assistant Professor
Operations, Technology and Innovation Management
Teaching Track

Áurea Quintino is an Assistant Professor at Nova School of Business and Economics. She holds a Ph.D. degree in Mathematics from the University of Bath (UK) and is a member of CMAFcIO – Center for Mathematics, Fundamental Applications and Operations Research of the University of Lisbon, developing her research activity in the area of Differential Geometry and having authored and co-authored several books and research articles. Prior to joining Nova SBE, she accumulated a vast teaching experience at FCT NOVA and at the Faculty of Sciences of the University of Lisbon.

2009 - Ph.D. in Mathematics (Differential Geometry), University of Bath, UK.

2001 - M.Sc. in Mathematics (Geometry and Topology), University of Lisbon.

1997 - B.Sc. in Mathematics (Pure Mathematics), University of Lisbon.

  • Quintino, Aurea C., Santos, Susana (2024). Polynomial conserved quantities for constrained Willmore surfaces. (Accepted/In press) Asian Journal of Mathematics.
  • Burstall, Francis E., Quintino, Áurea C. (2014). Dressing transformations of constrained Willmore surfaces. Communications in Analysis and Geometry, 22 (3), 469-518.
  • Burstall, F. E., Dorfmeister, J. F., Leschke, K., Quintino, A. C. (2013). Darboux transforms and simple factor dressing of constant mean curvature surfaces. Manuscripta Mathematica, 140 (1-2), 213-236.
  • Quintino, Áurea (2011). Spectral deformation and Bäcklund transformation of constrained Willmore surfaces. Differential Geometry And Its Applications, 29 (SUPPL. 1).
  • Quintino, Aurea C. (2021). Constrained Willmore surfaces: symmetries of a Möbius invariant integrable system. Cambridge University Press.
  • Quintino, A. C. (2017). Transformations of generalized harmonic bundles and constrained Willmore surfaces. Willmore energy and Willmore conjecture. Toda, M.D. (Eds.), CRC Press, Taylor & Francis group, Chapman & Hall/CRC Monographs and Research Notes in Mathematics, 9-47.
  • Quintino, Aurea C. (2011). Constant mean curvature surfaces at the intersection of integrable geometries. Geometry, Integrability and Quantization. Mladenov, I.M., Vilasi, G., Yoshioka, A. (Eds.), Bulgarian Academy of Sciences, Institute of Biophysics and Biomedical Engineering, Vol. 12, 305-319.