On the Class-Number of Binary Cubic Forms (I)

On quadratic fields with large 3-rank ⋮ The equidistribution of lattice shapes of rings of integers in cubic, quartic, and quintic number fields ⋮ Binary forms and orders of algebraic number fields ⋮ On the Davenport-Heilbronn theorems and second order terms ⋮ The average size of the 3‐isogeny Selmer groups of elliptic curves y2=x3+k ⋮ The density of discriminants of quintic rings and fields ⋮ Klein forms and the generalized superelliptic equation ⋮ On the number of integral binary n$n$‐ic forms having bounded Julia invariant ⋮ MANY CUBIC SURFACES CONTAIN RATIONAL POINTS ⋮ On the representation of unity by binary cubic forms ⋮ Computing elliptic curves over $\mathbb {Q}$ ⋮ Density of cubic field discriminants ⋮ Binary quartic forms having bounded invariants, and the boundedness of the average rank of elliptic curves ⋮ On the 3-rank of quadratic fields with prime or almost prime discriminant ⋮ The asymptotic number of integral cubic polynomials with bounded heights and discriminants ⋮ Prehomogeneous vector spaces and field extensions ⋮ Error estimates for the Davenport-Heilbronn theorems ⋮ Elliptic curves with Galois-stable cyclic subgroups of order 4 ⋮ The mean number of 3-torsion elements in the class groups and ideal groups of quadratic orders ⋮ Sur les propriétés de divisibilité des nombres de classes des corps quadratiques ⋮ The Adelic Zeta Function Associated With the Space of Binary Cubic Forms With Coefficients in a Function Field ⋮ Binary quartic forms with bounded invariants and small Galois groups ⋮ Sieve and 3-rank of quadratic fields ⋮ Metrische Sätze über transzendente Zahlen in \(P\)-adischen Körpern. II ⋮ The adèlic zeta function associated to the space of binary cubic forms. I: Global theory ⋮ How many rational points does a random curve have? ⋮ Black holes and Bhargava’s invariant theory