Let $G$ be a semisimple algebraic group over an algebraically closed field of arbitrary characteristic. (I'm most interested in the positive characteristic case). Let $B \subseteq G$ be a Borel subgroup. Let $\cal T$ denote the tangent bundle of the flag variety $G/B$ and let $\pi : {\cal T} \to G/B$ be the projection.
For each integral weight $\lambda$ we have a line bundle $\cal L(\lambda)$ on $G/B$. A lot is known about the pullbacks of these bundles to the cotangent bundle of $G/B$ (see work of Broer, Kumar, Lauritzen, Thomsen, etc). For example, it is known which of these pullbacks to the cotangent bundle is ample, and there have a been a series of papers studying the $G$-module structures of the global sections of these pullbacks.
On the other hand, I haven't seen analogous results regarding the pullbacks $\pi^* \cal L(\lambda)$ of these bundles to the tangent bundle $\cal T$. To be more precise, I am most interested in knowing which of these pullbacks is ample. It would also be interesting to know if anyone has studied the $G$-module structure of $H^0( \cal T, \pi^* \cal L(\lambda) )$ for various $\lambda$.
$\pi$
explicit in any case. $\endgroup$