Given a Riemann surface $S$, e.g. $\mathbb{P}^1(\mathbb{C})$, with complex conjugation on the coordinates and a holomorphic vector bundle $E$ over $S$.

The complex conjugation $f$ is not holomorphic, but $C^{\infty}$. So we can look at $f^{\*}E$ as a smooth vector bundle. Since $f$ is an involution $E$ and $f^{\*}E$ are isomorphic as smooth bundles. But somehow there should be more structure on $f^{\*}E$. I mean $f$ is antiholomorphic, that should be useful somehow.

Is there a way to define a (canonical?) complex structure on $f^{\*}E$, such that for any point $p$ we have an antilinear isomorphism $E_{p} \rightarrow f^{\*}E_{p}=E_{\overline{p}}? 

I think we don't get a linear iso, since the complex conjugation itself is only antilinear.