My research revolve around Random matrix theory.

Random matrices have proved to be a very useful tool for studying different physical and mathematical systems. Eventhough the corresponding system might be very complex, the underlying integrable structure often allows to get find a very efficient and elegant way to compute any physicaly meaningful quantity. My main interest consist in understanding the common structure underlying the different problems which are proved or conjectured to be equivalent to the computation of random matrix integrals. Among these applications, I am currently investigating more particularly enumerative geometrical problems, conformal field theories , string theories and their link to super-symmetric gauge theories.