Let $K$ be a field and consider $L = K(x)$ the field of rational functions. Let $v_{1}, v_{2}, v_{3}$ rational points in the abstract Riemann surface $S_{L|K}$, distinct from each other, and $w_{1}, w_{2}, w_{3}$ also rationals points in $S_{L|K}$, distinct from each other. I have to prove that there is a unique automorphism $\sigma$ of the extension $L|K$ such that $w_{i} = v_{i} \circ \sigma$.
Automorphism of $L|K$ mapping 3 distinct rational points of $S_{L|K}$ to other 3 distinct ones
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algebraic-geometry
commutative-algebra
algebraic-curves
valuation-theory
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0What do you mean by the " abstract Riemann surface $S_{L|K}$ ? – 2018-05-06