David Krumm
Published 2014-03-25, updated 2014-08-02Version 2
We construct an algorithm for solving the following problem: given a number field $K$, a positive integer $N$, and a positive real number $B$, determine all points in $\mathbb P^N(K)$ having relative height at most $B$. A theoretical analysis of the efficiency of the algorithm is provided, as well as sample computations showing how the algorithm performs in practice. Two variants of the method are described, and examples are given to compare their running times. In the case $N=1$ we compare our method to an earlier algorithm for enumerating elements of bounded height in number fields.
Algebraic $S$-integers of fixed degree and bounded height
Lattice point counting and height bounds over number fields and quaternion algebras
There are genus one curves of every index over every number field
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