A counterexample to a subadditivity conjecture of Cohen for Sophie Germain cyclic numbers
Abstract
An integer n 1 is cyclic if (n,φ(n))=1 (equivalently, if every group of order n is cyclic), and Sophie Germain cyclic if both n and 2n+1 are cyclic. Let Cσ(N) count the Sophie Germain cyclic integers in [1,N]. Cohen conjectured that Cσ is subadditive, Cσ(m+n) Cσ(m)+Cσ(n) for all 1 m n (his Conjecture 66), having checked m,n 106 without finding a counterexample. We give one: at m=31, n=3928, Cσ(3959)=697 > 696 = Cσ(31)+Cσ(3928). The argument is short, and is verified by the Lean 4 kernel.
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