My research is in algebraic geometry.
I study singularities
using methods from birational geometry, non-archimedean geometry, and
differential geometry. Specific tools include arc spaces and multiplier ideals.
I have also worked on questions of rationality of algebraic varities,
geometry of Fano manifolds, and Cremona groups.
Research to which I have contributed has been featured in the following articles:
- B. Totaro,
The ACC conjecture for log canonical thresholds [after de Fernex, Ein, Mustata, Kollár],
Séminaire Bourbaki, Juin 2010, 62éme année, 2009-2010, no. 1025
- J. Kollár,
The rigidity theorem of Fano–Segre–Iskovskikh–Manin–Pukhlikov–Corti–Cheltsov–de Fernex–Ein–Mustata–Zhuang,
in Birational Geometry of Hypersurfaces, Gargnano del Garda, Italy, 2018,
Lecture Notes of the Unione Matematica Italiana, Vol 26, Springer, 2019
- M. Lejeune-Jalabert,
The algebraic answer to the Nash problem for normal surfaces according to de Fernex and Docampo,
in Arc Schemes and Singularities, World Scientific Publishing, 2019
- M. Mauri,
The dual complex of singularities after de Fernex, Kollár and Xu ,
in Arc Schemes and Singularities, World Scientific Publishing, 2019
research partially suppported by the National Science Foundation