Let k be an algebraically closed field, char k ≠ 2, 3, and let X ⊂ P2 be an elliptic curve with defining polynomial f. We show that any non-trivial torsion point of order r, determines up to equivalence, a unique minimal matrix Φr of size 3r × 3r with linear polynomial entries such that detΦr = fr. We also show that the identity, thought of as the trivial torsion point of order r, determines up to equivalence, a unique minimal matrix Ψr of size (3r - 2) × (3r - 2) with linear and quadratic polynomial entries such that det Ψr = fr. © 2014 World Scientific Publishing Company.

Amit Tripathi

Department of Mathematics

G.V. Ravindra

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Journal	International Journal of Algebra and Computation
Publisher	World Scientific Publishing Co. Pte Ltd
ISSN	02181967