研究领域

低维拓扑，knot and link theory, TQFTs, classical and quantum invariants of links.

教育背景

2013-2017 PhD thesis at Universite de Bourgogne under the supervision of Peter SCHAUENBURG et Emmanuel WAGNER.

2012-2013 Master's degree in fundamental mathematics at Universite Paris 7 - Diderot.

2011-2012 Agregation Externe de Mathematiques. Rank 33.

2011-2013 Enrolled at the Ecole Normale Superieure de Cachan (Paris, France), a higher education institution for advanced undergraduate and graduate studies.

论文发表

1. A lower bound for the genus of a knot using the Links-Gould invariant. Joint work with Guillaume Tahar, submitted.

2. The Links-Gould invariant as a classical generalization of the Alexander polynomial ? Experimental Mathematics, Volume 27, 2018 - Issue 3, 251-264, DOI: 10.1080/10586458.2016.1255860.

3. Other quantum relatives of the Alexander polynomial through the Links-Gould invariants. Joint work with Bertrand Patureau-Mirand. Proceedings of the American Mathematical Society 145 (2017), 5419–5433.

4. On the Links-Gould invariant and the square of the Alexander polynomial, J. Knot Theory Ramifications, 25, 1650006 (2016).