On systems of Diophantine equations with a large number of integer solutions
Abstract
Let En=xi+xj=xk, xi · xj=xk: i,j,k ∈ 1,...,n. For each integer n ≥ 13, J. Browkin defined a system Bn ⊂eq En which has exactly bn solutions in integers x1,...,xn, where bn ∈ N\0 and the sequence bnn=13∞ rapidly tends to infinity. For each integer n ≥ 12, we define a system Tn ⊂eq En which has exactly tn solutions in integers x1,...,xn, where tn ∈ N\0 and limn ∞ tn/bn=∞.
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