Title: The moduli space of anisotropic Gaussian curves
Authors: J. Huisman and M. Lattarulo
Issue: Volume 58 (2009), Issue 6, 2409-2432
Abstract:
![Let $X$ be a real hyperelliptic curve. Its opposite curve $X^{-}$ is the curve obtained from $X$ by twisting the real structure on $X$ by the hyperelliptic involution. The curve $X$ is said to be Gaussian if $X^{-}$ is isomorphic to $X$. In an earlier paper, we have studied Gaussian curves having real points [J. Huisman and M. Lattarulo, \eph{Imaginary automorphisms on real hyperelliptic curves}, J. Pure Appl. Algebra \textbf{200} (2005), 318-331]. In the present paper we study Gaussian curves without real points, i.e., anisotropic Gaussian curves. We prove that the moduli space of such curves is a reducible connected real analytic subset of the moduli space of all anisotropic hyperelliptic curves, and determine its irreducible components.](https://iumj.s3-us-west-2.amazonaws.com/abstracts/3577.png)
Title: The moduli space of anisotropic Gaussian curves
Authors: J. Huisman and M. Lattarulo
Issue: Volume 58 (2009), Issue 6, 2409-2432
Abstract: