Cornelia Druțu

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Cornelia Druțu is a Romanian mathematician notable for her contributions in the area of geometric group theory.^[1] She is Professor of mathematics at the University of Oxford^[1] and Fellow^[2] of Exeter College, Oxford.

Druțu was born in Iași, Romania. She attended the Emil Racoviță High School (now the National College Emil Racoviță^[3]) in Iași. She earned a B.S. in Mathematics from the University of Iași, where besides attending the core courses she received extra curricular teaching in geometry and topology from Professor Liliana Răileanu.^[2]

In 1996 Druțu earned a Ph.D. in Mathematics from University of Paris-Sud, with a thesis entitled Réseaux non uniformes des groupes de Lie semi-simple de rang supérieur et invariants de quasiisométrie, written under the supervision of Pierre Pansu.^[4] She then joined the University of Lille 1 as Maître de conférences (MCF). In 2004 she earned her Habilitation degree from the University of Lille 1.^[5]

In 2009 she became Professor of mathematics at the Mathematical Institute, University of Oxford.^[1]

She held visiting positions at the Max Planck Institute for Mathematics in Bonn, the Institut des Hautes Études Scientifiques in Bures-sur-Yvette, the Mathematical Sciences Research Institute in Berkeley, California. She visited the Isaac Newton Institute in Cambridge as holder of a Simons Fellowship.^[6] From 2013 to 2020 she chaired the European Mathematical Society/European Women in Mathematics scientific panel of women mathematicians.^[7][8]

In 2009, Druțu was awarded the Whitehead Prize by the London Mathematical Society for her work in geometric group theory.^[9]

In 2017, Druțu was awarded a Simons Visiting Fellowship.^[6]

• The quasi-isometry invariance of relative hyperbolicity; a characterization of relatively hyperbolic groups using geodesic triangles, similar to the one of hyperbolic groups.
• A classification of relatively hyperbolic groups up to quasi-isometry; the fact that a group with a quasi-isometric embedding in a relatively hyperbolic metric space, with image at infinite distance from any peripheral set, must be relatively hyperbolic.
• The non-distortion of horospheres in symmetric spaces of non-compact type and in Euclidean buildings, with constants depending only on the Weyl group.
• The quadratic filling for certain linear solvable groups (with uniform constants for large classes of such groups).
• A construction of a 2-generated recursively presented group with continuum many non-homeomorphic asymptotic cones. Under the continuum hypothesis, a finitely generated group may have at most continuum many non-homeomorphic asymptotic cones, hence the result is sharp.
• A characterization of Kazhdan's property (T) and of the Haagerup property using affine isometric actions on median spaces.
• A study of generalizations of Kazhdan's property (T) for uniformly convex Banach spaces.
• A proof that random groups satisfy strengthened versions of Kazhdan's property (T) for high enough density; a proof that for random groups the conformal dimension of the boundary is connected to the maximal value of p for which the groups have fixed point properties for isometric affine actions on ${\displaystyle L^p}$ spaces.

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• Geometric group theory
• Ultralimit
• Tree-graded space
• Kazhdan's property (T)

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• personal webpage, University of Oxford
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