| Popis: |
Consider the complete flag variety $X$ of any complex semi-simple algebraic group $G$. We show that the structure coefficients of the Belkale-Kumar product $\odot_0$, on the cohomology ${\operatorname H}^{*}(X,\mathbb{Z})$, are all either $0$ or $1$. We also derive some consequences. The proof contains a geometric part and uses a combinatorial result on root systems. The geometric method is uniform whereas the combinatorial one is proved by reduction to small ranks and then, by direct checkings. |
