A variety of Euler's conjecture
Abstract
We consider a variety of Euler's conjecture, i.e., whether the Diophantine system \[cases n=a1+a2+·s+as-1, a1a2·s as-1(a1+a2+·s+as-1)=bs cases\] has solutions n,b,ai∈Z+,i=1,2,…,s-1,s≥ 3. By using the theory of elliptic curves, we prove that it has no solutions n,b,ai∈Z+ for s=3, but for s=4 it has infinitely many solutions n,b,ai∈Z+ and for s≥ 5 there are infinitely many polynomial solutions n,b,ai∈Z[t1,t2,…,ts-3] with positive value satisfying this Diophantine system.
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