(G,F)-points on Q-algebraic varieties

Abstract

Let G∈ Q[x,y,z] be a polynomial, and let V(G) be the Q-algebraic variety corresponding to G, i.e., V(G)=\P∈Q3~|~G(P)=0\. Let \[split F: &Q3→ Q3,\\ &(x,y,z) (f(x),f(y),f(z)) split\] be a vector function, where f∈ Q[x]. It is easy to know that the function obtained by the composition of G and F, denoted as G F, is still in Q[x,y,z]. Moreover, let V(G F) be the Q-algebraic variety corresponding to G F, i.e., V(G F)=\P∈Q3~|~G F(P)=0\. A rational point P is called a (G,F)-point on V(G) if P belongs to the intersection of V(G) and V(G F), that is P∈ V(G) V(G F). Denote G,F as the set consisting of all (G,F)-points on V(G). Obviously, G,F is a Q-algebraic variety. In this paper, we consider the algebraic variety G,F for some specific functions G and F. For these specific functions G and F, we prove that G,F will be isomorphic to a certain elliptic curve. We also analyze some properties of these elliptic curves.

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