Counting points of small height on elliptic curves

This algorithm generalizes the Gaudry–G¨ urel algorithm [ GG01 ] from superel- liptic curves to general cyclic covers, following the approach of Harrison [ Har12 ] for

When ν k + = ν k − for some k, there exist connections with scalar residue (apparent singular point) which give rise to a singular locus in the moduli space; the role of the

has shown that one can also bound the height of integral points of an elliptic curve E using lower bounds for linear forms in elliptic logarithms, in a more natural way than

(2012) have shown that source parameters estimated during the inversion are sensitive to the height of the release and receptors in low wind stable conditions.. In

This contravariant correspondence yields an equivalence between the homotopy category of 1- connected rational spaces of finite type and that of 1-connected rational cgda of finite

Assuming sequential conditional independence, we proposed semi- and nonparametric methods (using either parametric or nonparametric generalized propensity scores) for estimating

A real algebraic integer α > 1 is called a Salem number if α and 1/α are Galois conjugate and all other Galois conjugates of α lie on the unit circle.. It is not known whether 1 is

We propose a totally explicit lower bound for the N´eron-Tate height of algebraic points of infinite order of abelian varieties.. Let k be a number field of degree D = [k :