arXiv:1510.02839 Abstract | arXiv Analytics

arXiv:1510.02839 [math.NT]Abstract References Reviews Resources

Period and index for higher genus curves

Published 2015-10-09Version 1

Given a curve $C$ over a field $K$, the period of $C/K$ is the gcd of degrees of $K$-rational divisor classes, while the index is the gcd of degrees of $K$-rational divisors. S. Lichtenbaum showed that the period and index must satisfy certain divisibility conditions. For given admissible period, index, and genus, we show that there exists a curve $C$ and a number field $K$ with these desired invariants, as long as the index is not divisible by $4$.

Categories: math.NT

Keywords: higher genus curves, rational divisor classes, number field, divisibility conditions, lichtenbaum

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arXiv:1510.02839 [math.NT]Abstract References Reviews Resources

Period and index for higher genus curves

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Period and index for higher genus curves

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arXiv:1510.02839 [math.NT]Abstract References Reviews Resources