The field of moduli of plane curves
Abstract
We prove that a smooth, complex plane curve of odd degree can be defined by a polynomial with coefficients in R if and only if it is isomorphic to its complex conjugate; there are counterexamples in even degree. Over arbitrary base fields of characteristic 0, we prove that a smooth plane curve of degree prime with 6 can be defined by a polynomial with coefficients in the field of moduli. We also prove results about fields of moduli of algebraic cycles in P2. In particular, these apply to singular plane curves of arbitrary degree, too.
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