Hershey Kisilevsky - Rank of E(K) for cyclic cubic extensions

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Hershey Kisilevsky - Rank of E(K) for cyclic cubic extensions $K/{\bf Q}$

HERSHEY KISILEVSKY, Concordia University, Montreal, Quebec H3G 1M8, Canada

Rank of E(K) for cyclic cubic extensions $K/{\bf Q}$

For an elliptic curve, E, defined over the rational field, we consider the rank of E(K) for cyclic cubic extensions $K/{\bf Q}$ .