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The Minimal Absolute Value of Sums of Fifth Roots of Unity
arXiv Math
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이 매체는 공공·자유 라이선스로 본문을 직접 표시합니다.Abstract
We determine the minimal absolute value of a non-vanishing sum of $n$ fifth roots of unity chosen with repetition, and characterize the corresponding sums.
As a function of $n$, the minimal absolute value is monotone non-increasing over congruence classes of $n$ modulo $5$ and its only jumps occur when $n=5F_m$, $n=L_m$, or $n=2L_m$, where $F_m$ and $L_m$ denote the $m$-th Fibonacci and Lucas numbers respectively.
To prove our results we reduce the problem to a series of inequalities involving rational approximations of the golden ratio $\varphi=(1+\sqrt{5})/2$, the solutions of which can be characterized using the theory of continued fractions.
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