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Abstract
In 1967, Shioda [Citation20] determined the ring of invariants of binary octavics and their syzygies using the symbolic method. We discover that the syzygies determined in [Citation20] 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 k, char k ≠ 2, 3, 5, 7. For the first time, an explicit equation of the hyperelliptic moduli for genus 3 is computed in terms of absolute invariants.
2010 Mathematics Subject Classification:
ACKNOWLEDGMENTS
The author thanks the anonymous referee for useful suggestions on improving this paper.
Notes
Communicated by P. Tiep.