Small values of signed harmonic sums and logarithmic means of multiplicative functions

Abstract

We construct sequences \an\n∈N∈\-1,1\N with small values of signed harmonic sums \[ Σn∈A[1,N]ann, \] for any reasonably dense subsets A⊂N. We apply these methods to further construct completely multiplicative functions f:N\-1,1\ with unusually small logarithmic partial sums, that is, \[ Σn ≤ Nf(n)n (-c0 N1/3( N)1/3 ) \] holds for infinitely many N∞. The proofs combine careful analysis of the small-scale distribution of random harmonic sums over subsets of N, together with deterministic inductive arguments inspired by the ``anatomy" of integers.