In the paper "On Minuscule Representations and the Principal SL2" by B.H. Gross (link: here) and some others the terminology "Lefschetz $\operatorname{SL}_2$" is used. I think I am confused and lacking background to understand some of the things in this paper, so I have some basic questions.
My first question is the following. What is a Lefschetz $\operatorname{SL}_2$?
Also, in the paper by Gross the setup is that we have $G$ and algebraic group, $P$ a maximal parabolic subgroup associated with a minuscule coweight. He states that there is a Lefschetz $\operatorname{SL}_2$, call it $H$, which acts on the cohomology $H^*(G/P)$ of the flag variety. I guess you could construct $H$ by observing that the set of weights admits an $\operatorname{SL}_2$-representation. But is $H$ defined as some subgroup of $G$? Or with some other natural construction?
The main thing I am interested in is that there is an isomorphism of $\operatorname{SL}_2$-modules $H^*(G/P) \rightarrow V$, where $V$ is a minuscule representation of the dual group $\widehat{G}$. Here the action of $\operatorname{SL}_2$ on $V$ is the action of the principal $\operatorname{SL}_2$ of $\widehat{G}$. The proof in the paper is by noting that the weights of the two representations are the same. Is there some "natural" isomorphism?
