On \(p\)-gonal fields of definition
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Publication:6597989
DOI10.26493/1855-3974.2570.5e8zbMATH Open1548.30109MaRDI QIDQ6597989
Publication date: 4 September 2024
Published in: Ars Mathematica Contemporanea (Search for Journal in Brave)
Compact Riemann surfaces and uniformization (30F10) Riemann surfaces; Weierstrass points; gap sequences (14H55) Automorphisms of curves (14H37)
Cites Work
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- On gonality of Riemann surfaces
- Fields of moduli and definition of hyperelliptic curves of odd genus
- Groups of automorphisms of cyclic trigonal Riemann surfaces
- Defining equations for cyclic prime covers of the Riemann sphere
- Field of moduli versus field of definition for cyclic covers of the projective line
- Topologically unique maximal elementary Abelian group actions on compact oriented surfaces
- Non-hyperelliptic Riemann surfaces with real field of moduli but not definable over the reals
- On Riemann surfaces with monogenic transformations into themselves.
- On those algebraic equations between two variable quantities, which allow a family of rational, invertible transformations into themselves.
- p-Groups acting on Riemann surfaces
- On prime Galois coverings of the Riemann sphere
- A remark on the field of moduli of Riemann surfaces
- Maximal order of automorphisms of trigonal Riemann surfaces
- The full automorphism group of a cyclic \(p\)-gonal surface
- Hyperelliptic curves and their invariants: geometric, arithmetic and algorithmic aspects
- On automorphisms groups of cyclic \(p\)-gonal Riemann surfaces
- Erratum to: ``Fields of moduli and definition of hyperelliptic covers
- Explicit Galois obstruction and descent for hyperelliptic curves with tamely cyclic reduced automorphism group
- The Field of Definition of a Variety
- On Cyclic Trigonal Riemann Surfaces. I
- On the Field of Rationality for an Abelian Variety
- The Fields of Moduli for Polarized Abelian Varieties and for Curves
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