The Tu--Deng Conjecture holds almost surely

Abstract

The Tu--Deng Conjecture is concerned with the sum of digits w(n) of n in base~2 (the Hamming weight of the binary expansion of n) and states the following: assume that k is a positive integer and 1≤ t<2k-1. Then \[ \(a,b)∈\0,…,2k-2\2:a+b t 2k-1, w(a)+w(b)<k\ ≤ 2k-1.\] We prove that the Tu--Deng Conjecture holds almost surely in the following sense: the proportion of t∈[1,2k-2] such that the above inequality holds approaches 1 as k→∞. Moreover, we prove that the Tu--Deng Conjecture implies a conjecture due to T.~W.~Cusick concerning the sum of digits of n and n+t.