The Erdos discrepancy problem over the squarefree and cubefree integers

Abstract

Let g:N\-1,1\ be a completely multiplicative function, μ be the M\"obius function and μ22(n) be the indicator that n is cubefree. We prove that f=μ2g and f=μ22g have unbounded partial sums. Our proofs are built upon Klurman and Mangerel's proof of Chudakov's conjecture, Klurman's work on correlations of multiplicative functions and Tao's resolution of the Erdos discrepancy problem.