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A zero-sqrt(5)/ 2 law for cosine families

Let $a \in \R,$ and let $k(a)$ be the largest constant such that $sup\vert cos(na)-cos(nb)\vert \textless{} k(a)$ for $b\in \R$ implies that $b \in \pm a+2π\Z. $ We show that if a cosine sequence $(C(n))\_{n\in \Z}$ with values in a Banach algebra $A$ satisfies $sup\_{n\ge 1}\Vert C(n) -cos(na).1\_A\Vert \textless{} k(a),$ then $C(n)=cos(na)$ for $n\in \Z.$ Since ${\sqrt 5\over 2} \le k(a) \le {8\over 3\sqrt 3}$ for every $a \in \R,$ this shows that if some cosine family $(C(g))\_{g\in G}$ over an abelian group $G$ in a Banach algebra satisfies $sup\_{g\in G}\Vert C(g)-c(g)\Vert \textless{} {\sqrt 5\over 2}$ for some scalar cosine family $(c(g))\_{g\in G},$ then $C(g)=c(g)$ for $g\in G,$ and the constant ${\sqrt 5\over 2}$ is optimal. We also describe the set of all real numbers $a \in [0,π]$ satisfying $k(a)\le {3\over 2}.$