The generalized Mukai conjecture for symmetric varieties

Abstract

We associate to any complete spherical variety X a certain nonnegative rational number (X), which we conjecture to satisfy the inequality (X) dim X - rank X with equality holding if and only if X is isomorphic to a toric variety. We show that, for spherical varieties, our conjecture implies the generalized Mukai conjecture on the pseudo-index of smooth Fano varieties due to Bonavero, Casagrande, Debarre, and Druel. We also deduce from our conjecture a smoothness criterion for spherical varieties. It follows from the work of Pasquier that our conjecture holds for horospherical varieties. We are able to prove our conjecture for symmetric varieties.