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Writing a positive integer as sum of two terms of sequence.

Source: ILL 1979-52

June 5, 2011
number theory unsolvednumber theory

Problem Statement

Let a real number λ>1\lambda > 1 be given and a sequence (nk)(n_k) of positive integers such that nk+1nk>λ\frac{n_{k+1}}{n_k}> \lambda for k=1,2,k = 1, 2,\ldots Prove that there exists a positive integer cc such that no positive integer nn can be represented in more than cc ways in the form n=nk+njn = n_k + n_j or n=nrnsn = n_r - n_s.
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