I am a mathematician specializing in noncommutative geometry and functional analysis. My research explores new metric-based concepts in noncommutative geometry, with a sight on potential applications to mathematical physics. My main contribution is the introduction and study of analogues of the Gromov-Hausdorff distance on spaces of quantum metric spaces, metric spectral triples, and other related structures.
I hold a Ph.D. in Mathematics from U.C. Berkeley, as well as Master degrees in Statistics (U.C. Berkeley), Statistics and Economics (ENSAE ParisTech), and a Maitrise de Mathematiques et Applications Fondamentales (University of Pierre et Marie Curie). I am currently a tenured, full professor in mathematics at the University of Denver.