A system of certain linear Diophantine equations on analogs of squares

Abstract

This study investigates the existence of tuples (k, , m) of integers such that all of k, , m, k+, +m, m+k, k++m belong to S(α), where S(α) is the set of all integers of the form α n2 for n≥ α-1/2 and x denotes the integer part of x. We show that T(α), the set of all such tuples, is infinite for all α∈ (0,1) Q and for almost all α∈ (0,1) in the sense of the Lebesgue measure. Furthermore, we show that if there exists α>0 such that T(α) is finite, then there is no perfect Euler brick. We also examine the set of all integers of the form α n2 for n∈ N.

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