On the largest singular vector of the Redheffer matrix
Abstract
The Redheffer matrix An ∈ Rn × n is defined by setting Aij = 1 if j=1 or i divides j and 0 otherwise. One of its many interesting properties is that (An) = O(n1/2 + ) is equivalent to the Riemann hypothesis. The singular vector v ∈ Rn corresponding to the largest singular value carries a lot of information: vk is small if k is prime and large if k has many divisors. We prove that the vector w whose k-th entry is the sum of the inverse divisors of k, wk = Σd|k 1/d, is close to a singular vector in a precise quantitative sense.
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