New solutions of the Tarry-Escott problem of degrees 2, 3 and 5
Abstract
In this paper we obtain new parametric ideal solutions of the Tarry-Escott problem of degrees 2, 3 and 5, that is, of the diophantine systems Σi=1k+1xij=Σi=1k+1yij,\;j=1,\,2,\,…,\,k, when k is 2, 3 or 5. When k=2, we obtain the complete ideal solution in terms of polynomials in six parameters p, q, r, a, b and c such that the common sums σj=Σi=13xij=Σi=13yij for both j=1 and j=2 are symmetric functions of the parameters p, q, r and also symmetric functions of the parameters a, b, c. When k=3, we obtain a solution in terms of polynomials in four parameters p, q, r and s such that the three common sums σj= Σi=14xij=Σi=14yij, j=1, 2, 3, are symmetric functions of all the four parameters p, q, r and s. When k=5, our solution is derived from the solution already obtained when k=2, and the common sums, defined as in the cases when k=2 or 3, are either 0 or have properties similar to the case when k=2.
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