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http://dx.doi.org/10.4134/BKMS.b180167

AVERAGE VALUES ON THE JACOBIAN VARIETY OF A HYPERELLIPTIC CURVE  

Chung, Jiman (Department of Mathematics Chung-Ang University)
Im, Bo-Hae (Department of Mathematical Sciences KAIST)
Publication Information
Bulletin of the Korean Mathematical Society / v.56, no.2, 2019 , pp. 333-349 More about this Journal
Abstract
We give explicitly an average value formula under the multiplication-by-2 map for the x-coordinates of the 2-division points D on the Jacobian variety J(C) of a hyperelliptic curve C with genus g if $2D{\equiv}2P-2{\infty}$ (mod Pic(C)) for $P=(x_P,y_P){\in}C$ with $y_P{\neq}0$. Moreover, if g = 2, we give a more explicit formula for D such that $2D{\equiv}P-{\infty}$ (mod Pic(C)).
Keywords
Jacobian variety; hyperelliptic curve;
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