7 research outputs found
Rational points in the moduli space of genus two
We build a database of genus 2 curves defined over which contains
all curves with minimal absolute height , all curves with moduli
height , and all curves with extra automorphisms in
standard form defined over with height .
For each isomorphism class in the database, an equation over its minimal field
of definition is provided, the automorphism group of the curve, Clebsch and
Igusa invariants. The distribution of rational points in the moduli space
for which the field of moduli is a field of definition is
discussed and some open problems are presented
Some remarks on the hyperelliptic moduli of genus 3
In 1967, Shioda \cite{Shi1} determined the ring of invariants of binary
octavics and their syzygies using the symbolic method. We discover that the
syzygies determined in \cite{Shi1} are incorrect. In this paper, we compute the
correct equations among the invariants of the binary octavics and give
necessary and sufficient conditions for two genus 3 hyperelliptic curves to be
isomorphic over an algebraically closed field , . For
the first time, an explicit equation of the hyperelliptic moduli for genus 3 is
computed in terms of absolute invariants.Comment: arXiv admin note: text overlap with arXiv:1209.044