Abstract:
A variety $X$ with a faithful action of a finite group $G$ is called $G$-unirational,
if there exists a faithful linear representation $V$ of $G$, and a $G$-equivariant dominant
rational map $V \dashrightarrow X$. We prove a criterion of $G$-unirationality for
del Pezzo surfaces of degree 3 or more.
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