Repr\'esentations irr\'eductibles de certaines alg\`ebres d'op\'erateurs diff\'erentiels

Abstract

For a projective variety X and a line bundle L over X, one considers the L-twisted global differential operator algebra DL(X) which naturally operates on the space of global sections H0(X,L). In the case where X is the wonderful compactification of the group PGL3, one proves that the space H0(X,L) is an irreducible representation of the algebra DL(X) or zero. For that, one introduces a 2-order differential operator which is defined over whole X but which does not arise from the infinitesimal action of the automorphism group Aut(X).