Partitions into Triples with Equal Products and Families of Elliptic Curves

Abstract

Let Sl(M,N) denote a set of triples of positive integers having the same sum M and the same product N. For each 2≤≤ 4 we establish a connection between a subset of Sl(M,N) with (integral) parametric elements and a family of elliptic curves. When =2 and 3, we use certain known subsets of Sl(M,N) with parametric elements and respectively find families of elliptic curves of generic rank ≥ 5 and ≥ 6, while for =4 we first obtain a subset of Sl(M,N) with parametric elements, then construct a family of elliptic curves of generic rank ≥ 8. Finally, we perform a computer search within these families to find specific curves with rank ≥ 11 and in particular we found two curves of rank 14.