A Mordellic variety refers to a specific type of algebraic variety that has a rational point and whose set of rational points is a finitely generated abelian group. More formally, a variety \( V \) over a number field \( K \) is said to be a Mordellic variety if it satisfies the following conditions: 1. \( V \) has a rational point, which means there exists a point in \( V \) with coordinates in \( K \).
New to topics? Read the docs here!