Let $U$ be an open subset of $\mathbb P^1$ without two points (say $t=0$ and $t=\infty$) and $j: U\to \mathbb P^1$ be an open immersion. Ground field $k$ is algeraically closed. Let $G$ be the group scheme over $\mathbb P^1$ given by $x^2 - ty^2 = 1$ I am interested in computing the stalks of the skyscraper $R^1j_*G$. It looks that the stalk at point $t=0$ must be isomorphic to the group $\mathrm H^1_{et}(k((t)), G) \simeq \mathbb Z/2$ but cannot confirm this result. My motivation comes from [this](http://mathoverflow.net/questions/181239/compute-higher-direct-image-for-gm-under-open-embedding) example, but I want to apply it for the group scheme $G$. P.S. Moreover, it looks that $j_*G \simeq G$, just by computing the stalks of the quotient for a natural map $G \to j_*G$ on $\mathbb P^1$. Cannot confirm this either.