The Structure of Morava Stabilizer Algebras.
The symmetry algebra and conserved Currents for Klein-Gordon equation on quantum Minkowski space
The symmetry operators for Klein-Gordon equation on quantum Minkowski space are derived and their algebra is studied. The explicit form of the Leibniz rules for derivatives and variables for the case Z=0 is given. It is applied then with symmetry operators to the construction of the conservation law and the explicit form of conserved currents for Klein-Gordon equation.
The Theta Correspondence and Harmonic Forms. II.
The topology of spaces of coprime polynomials.
The Z*-theorem for compact Lie groups.
Théorie de Schreier supérieure
Topological charges and high dimensional instantons
Torsion in cohomology of compact Lie groups and Chow rings of reductive algebraic groups.
Towards the algebra structure of the Morava k-theory of the orthogonal groups.
Transgression and Clifford algebras
Let be a differential (not necessarily commutative) algebra which carries a free action of a polynomial algebra with homogeneous generators . We show that for acyclic, the cohomology of the quotient
Transitive actions on Hopf homogeneous spaces.
Travaux de Quillen sur la cohomologie des groupes