Smooth plane curves with a unique outer Galois point and their automorphism groups
Abstract
We consider smooth plane curves X of degree d≥4, defined over an algebraically closed field of characteristic 0, that possess a unique outer Galois point. This geometric condition forces the curve to be a cyclic covering of the projective line, and ensures that its automorphism group fits into a specific theoretical framework. For each possible non-cyclic reduced automorphism group Autred(X), we fully characterize the defining equation of X and the precise structure of its full automorphism group Aut(X). This comprehensive analysis not only identifies the exact form of the equation for each automorphism type but also establishes the detailed criteria under which these scenarios can occur, thereby offering a complete classification of defining equations for smooth plane curves with a unique outer Galois point and a non-cyclic reduced automorphism group.
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