Elliptic curves with complex multiplication and Galois module structure

In this paper we state the problem of Galois module structure of rings of integers of extensions attached to the elliptic curves without complex multiplication and admitting a rational point of finite order. Our main aim is to give the first results related to this problem. These results are an anal

Let k be a finite field and let E be an elliptic curve over k. In this paper we describe, for each finite extension l of k, the structure of the group E(l) of points of E over l as a module over the ring R of endomorphisms of E that are defined over k. If the Frobenius endomorphism ? of E over k doe

Let \(K\) be a quadratic imaginary number field and \(R_{f}\) the ring class field modulo \(f\) over \(K, f \in \mathbb{N}\). Let \(\theta_{f}\) denote the order of conductor \(f\) in \(K\) and let \(\mathfrak{g}^{*}, \mathrm{~g}\) be proper O \(\gamma\)-ideals such that \(\mathbf{g}^{* 2} \subseteq

&163 ). We want to calculate the character sum where ( } Âp) is the Legendre symbol. We show that it is enough to calculate the sum for a finite number of primes and this has been done.