Macdonald polynomials and counting parabolic bundles

Mardi 13 mars 2018 14:15-15:15 - Anton Mellit - Université de Vienne

Résumé : Schiffmann obtained a formula for the (weighted) number of vector
bundles with nilpotent endomorphism over a curve over a finite field.
This talk will be about counting parabolic bundles with nilpotent
endomorphism. The result we obtain gives an interesting new
interpretation of Macdonald polynomials. Our formula turns out to be
similar to the conjecture of Hausel, Letellier and Rodriguez-Villegas,
which gives the mixed Hodge polynomials of character varieties. This
allows us to obtain further evidence for their conjecture : we prove
that it gives the correct Poincare polynomials of character varieties.

Lieu : IMO Bât. 307, salle 3L15

Macdonald polynomials and counting parabolic bundles  Version PDF