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

Abstract

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