Vector bundles on smooth projective curves/semistable and strongly semistable/Definition

Let ${\displaystyle {}{\mathcal {S}}}$ be a vector bundle on a smooth projective curve ${\displaystyle {}C}$. It is called semistable, if  ${\displaystyle {}\mu ({\mathcal {T}})={\frac {\deg({\mathcal {T}})}{\operatorname {rk} ({\mathcal {T}})}}\leq {\frac {\deg({\mathcal {S}})}{\operatorname {rk} ({\mathcal {S}})}}=\mu ({\mathcal {S}})}$  for all subbundles ${\displaystyle {}{\mathcal {T}}}$.

Suppose that the base field has positive characteristic  ${\displaystyle {}p>0}$.  Then ${\displaystyle {}{\mathcal {S}}}$ is called strongly semistable, if all (absolute) Frobenius pull-backs ${\displaystyle {}F^{e*}({\mathcal {S}})}$ are semistable.