On curves over finite fields with Jacobians of small exponent
classification
🧮 math.NT
keywords
exponentfieldsfinitesmallbestboundscasecurve
read the original abstract
We show that finite fields over which there is a curve of a given genus g with its Jacobian having a small exponent, are very rare. This extends a recent result of W. Duke in the case g=1. We also show when g=1 or g=2 that our bounds are best possible.
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