The Lie Group Structure of Elliptic/Hyperelliptic Functions
Abstract
We consider the generalized dual transformation for elliptic/hyperelliptic functions up to genus three. For the genus one case, from the algebraic addition formula, we deduce that the Weierstrass function has the SO(2,1) Sp(2,)/2 Lie group structure. For the genus two case, by constructing a quadratic invariant form, we find that hyperelliptic functions have the SO(3,2) Sp(4,)/2 Lie group structure. Making use of quadratic invariant forms reveals that hyperelliptic functions with genus three have the SO(9,6) Lie group and/or it's subgroup structure.
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