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The Enriques surface of minimal entropy

Published 26 Nov 2025 in math.AG and math.DS | (2511.21286v1)

Abstract: Lehmer's number $λ{10}$ is the smallest dynamical degree greater than $1$ that can occur for an automorphism of an algebraic surface. We show that $λ{10}$ cannot be realized by automorphisms of Enriques surfaces in odd characteristic, extending a result of Oguiso over the complex numbers. In contrast, we prove that in characteristic $2$ there exists a unique Enriques surface that admits an automorphism with dynamical degree $λ{10}$. We also provide explicit equations for the surface as well as for all conjugacy classes of automorphisms that realize $λ{10}$.

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