Alexander Braverman
Published 2002-02-18Version 1
Let $k$ be an algebraically closed field of characteristic $p>0$ and let $\ell$ be another prime number. O. Gabber and F. Loeser proved that for any algebraic torus $T$ over $k$ and any perverse $\ell$-adic sheaf $\calF$ on $T$ the Euler characteristic $\chi(\calF)$ is non-negative. We conjecture that the same result holds for any perverse sheaf $\calF$ on a reductive group $G$ over $k$ which is equivariant with respect to the adjoint action. We prove the conjecture when $\calF$ is obtained by Goresky-MacPherson extension from the set of regular semi-simple elements in $G$. From this we deduce that the conjecture holds for $G$ of semi-simple rank 1.
Equivariant sheaves on some spherical varieties
Degree formula for the Euler characteristic
Compactly supported $\mathbb{A}^{1}$-Euler characteristic and the Hochschild complex
![QR code for arXiv:math/0202165 [math.AG]](http://oss.arxitics.com/images/favicon.svg)