On the arithmetic of a family of twisted constant elliptic curves

Abstract

Let Fr be a finite field of characteristic p>3. For any power q of p, consider the elliptic curve E=Eq,r defined by y2=x3 + tq -t over K=Fr(t). We describe several arithmetic invariants of E such as the rank of its Mordell--Weil group E(K), the size of its N\'eron--Tate regulator Reg(E), and the order of its Tate--Shafarevich group III(E) (which we prove is finite). These invariants have radically different behaviors depending on the congruence class of p modulo 6. For instance III(E) either has trivial p-part or is a p-group. On the other hand, we show that the product |III(E)|Reg(E) has size comparable to rq/6 as q∞, regardless of p6. Our approach relies on the BSD conjecture, an explicit expression for the L-function of E, and a geometric analysis of the N\'eron model of E.