Real structures on rational surfaces and automorphisms acting trivially on Picard groups
Abstract
In this article, we prove that any complex smooth rational surface X which has no automorphism of positive entropy has a finite number of real forms (this is especially the case if X cannot be obtained by blowing up P2 C at r≥ 10 points). In particular, we prove that the group Aut\#X of complex automorphisms of X which act trivially on the Picard group of X is a linear algebraic group defined over R.
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