Relations between the random variable wx and the Dirichlet divisor problem

Abstract

We have developed a heuristic showing that in the Dirichlet divisor problem for the almost all n ∈ N+: R(n) ≤ O((n)n14) where R(n) = Σx=1nnx - nn - (2γ-1)n and (n) - any positive function that increases unboundedly as n ∞ . The result is achieved under the hypothesis: \nx \ wx where wx is uniformly distributed over [0,1) random variable with a values set \0, 1 x, …, x-1x \ and the value accepting probability p = 1x . The paper concludes with a numerical argument in support of the hypothesis being true. It is shown that the expectation: μ1 [Σx=1n(nx - x-12x) ]= (2n+1)Hn - n2 - n + C has deviation from D(n) is less than R(n) in absolute value for all n < 105.