On classification and construction of algebraic Frobenius manifolds
Yassir Dinar (Scuola Internazionale Superiore di Studi Avanzati)
Tuesday 16th November, 2010 15:00-16:00 Mathematics Building, room 515
Abstract
I will speak about a work in progress to prove Dubrovin conjecture on classification of algebraic Frobenius manifolds. The conjecture is stated as follows: semisimple algebraic Frobenius manifolds correspond to quasi-Coxeter conjugacy classes in Coxeter groups. I will give some details about the construction of nontrivial algebraic Frobenius manifolds which support this conjecture. These manifolds are obtained from the classical $W$-algebras associated to the subregular nilpotent orbits in the Lie algebra of type $D_r$, $r$ is even or $E_r$, $r=6,7,8$. These manifolds are certain hypersurfaces in the total spaces of semiunivesal deformation of the simple singularities of the same type.
Add to your calendar
Download event information as iCalendar file (only this event)