Torsor over projective curve/Strongly semistable/Affineness criterion/Fact

Let ${\displaystyle {}C}$ denote a smooth projective curve over an algebraically closed field ${\displaystyle {}K}$ and let ${\displaystyle {}{\mathcal {S}}}$ be a strongly semistable vector bundle over ${\displaystyle {}C}$ together with a cohomology class ${\displaystyle {}c\in H^{1}(C,{\mathcal {S}})}$.

Then the torsor ${\displaystyle {}T(c)}$ is an affine scheme if and only if

${\displaystyle {}\operatorname {deg} {\left({\mathcal {S}}\right)}<0}$ and ${\displaystyle {}c\neq 0}$ (${\displaystyle {}F^{e}(c)\neq 0}$

for all ${\displaystyle {}e}$ in positive characteristic^[1]).