On the Mordell–Weil rank and 2-Selmer group of a family of elliptic curves

Puntos clave

• The Mordell-Weil rank provides crucial information about rational points on elliptic curves, enhancing understanding in number theory.
• Key findings suggest that the structure of the 2-Selmer group influences the rank significantly across various elliptic curve families.
• Analysis of elliptic curves demonstrates a relationship between their rank and the 2-Selmer group, impacting classification efforts in number theory.
• Potential limitations include varying complexity in elliptic curves, indicating the need for deeper investigations into related algebraic structures.