Édouard Brézin


Édouard Brézin is a French theoretical physicist. He is professor at Université Paris 6, working at the laboratory for theoretical physics of the École Normale Supérieure since 1986.

Biography

Brézin was born in Paris, France, to a family of Jewish background. He studied at École Polytechnique before doing a PhD. He worked at the theory division of the Commissariat à l'énergie atomique in Saclay until 1986.
Brezin contributed to the field of physics that deals with the macroscopic physical properties of matter and high energy physics. He was a leader in critical behavior theory and developed methods for distilling testable predictions for critical exponents. In using field theoretic techniques in the study of condensed matter, Brezin helped further modern theories of magnetism and the quantum Hall effect.
Brézin was elected a member of the French Academy of Sciences on 18 February 1991 and served as president of the academy in 2005-2006. He also is a foreign associate of the United States National Academy of Sciences, a foreign honorary member of the American Academy of Arts and Sciences, a foreign member of the Royal Society and a member of the Academia Europaea. He is a commander in the French National order of merit and an Officer of the Legion of Honor.
He is Chair of the Cyprus Research and Educational Foundation.
He was awarded the 2011 Dirac Medal of the International Centre for Theoretical Physics together with John Cardy and Alexander Zamolodchikov.
In 2004 he won the Institute of Physics President's Medal.

Research work

Edouard Brezin's work is devoted to quantum field theory, mainly for applications in statistical physics. It uses the theoretical formulation of the renormalization group for critical phenomena. He showed that the low temperature phase, in the case of a continuous symmetry break, is described by a non-linear sigma model, leading to a development of critical exponents in powers of the minus two space dimension. He showed that the instantaneous method can be used to characterize the asymptotic behaviour of perturbation theory, thus allowing accurate theoretical estimates to be made. He has applied field theory techniques to condensed matter problems, such as critical wetting theory or the study of the phase transition from a normal metal to a type II superconductor under magnetic field. He became interested in theories of gauging with a large number of colors. This led to a representation of two-dimensional quantum gravity by random fluctuating surfaces or closed bosonic strings, in terms of random matrices. He showed that the continuous boundary of such models is linked to integrable hierarchies such as KdV flows. He has also worked on establishing the universality of eigenvalue correlations for random matrices.

Notable publications