Sequences associated to elliptic curves

Abstract

Let E be an elliptic curve defined over a field K (with char(K)≠ 2) given by a Weierstrass equation and let P=(x,y)∈ E(K) be a point. Then for each n ≥ 1 and some γ ∈ K we can write the x- and y-coordinates of the point [n]P as equation* n]P=( φn(P)n2(P), ωn(P) n3(P) ) =( γ2 Gn(P)Fn2(P), γ3 Hn(P)Fn3(P)) equation* where φn,n,ωn ∈ K[x,y], (φn,n2)=1 and equation* Fn(P) = γ1-n2n(P), Gn(P) = γ -2n2φn(P),Hn(P) = γ -3n2 ωn(P) equation* are suitably normalized division polynomials of E. In this work we show the coefficients of the elliptic curve E can be defined in terms of the sequences of values (Gn(P))n≥ 0 and (Hn(P))n≥ 0 of the suitably normalized division polynomials of E evaluated at a point P ∈ E(K). Then we give the general terms of the sequences (Gn(P))n≥ 0 and (Hn(P))n≥ 0 associated to Tate normal form of an elliptic curve. As an application of this we determine square and cube terms in these sequences.