In mathematics, the von Mangoldt function is an arithmetic function named after German mathematician Hans von Mangoldt. It is an example of an important arithmetic function that is neither multiplicative nor additive.

Definition

The von Mangoldt function, denoted by Λ(n) , is defined as The values of Λ(n) for the first nine positive integers (i.e. natural numbers) are which is related to.

Properties

The von Mangoldt function satisfies the identity The sum is taken over all integers d that divide n. This is proved by the fundamental theorem of arithmetic, since the terms that are not powers of primes are equal to 0 . For example, consider the case . Then By Möbius inversion, we have and using the product rule for the logarithm we get For all x\ge 1, we have Also, there exist positive constants c1 and c2 such that for all x\ge 1, and for all sufficiently large x .

Dirichlet series

The von Mangoldt function plays an important role in the theory of Dirichlet series, and in particular, the Riemann zeta function. For example, one has The logarithmic derivative is then These are special cases of a more general relation on Dirichlet series. If one has for a completely multiplicative function f(n) , and the series converges for Re(s) > σ0 , then converges for Re(s) > σ0 .

Chebyshev function

The second Chebyshev function ψ(x) is the summatory function of the von Mangoldt function: It was introduced by Pafnuty Chebyshev who used it to show that the true order of the prime counting function \pi(x) is x/\log x. Von Mangoldt provided a rigorous proof of an explicit formula for ψ(x) involving a sum over the non-trivial zeros of the Riemann zeta function. This was an important part of the first proof of the prime number theorem. The Mellin transform of the Chebyshev function can be found by applying Perron's formula: which holds for Re(s) > 1 .

Exponential series

Hardy and Littlewood examined the series in the limit y → 0+ . Assuming the Riemann hypothesis, they demonstrate that In particular this function is oscillatory with diverging oscillations: there exists a value K > 0 such that both inequalities hold infinitely often in any neighbourhood of 0. The graphic to the right indicates that this behaviour is not at first numerically obvious: the oscillations are not clearly seen until the series is summed in excess of 100 million terms, and are only readily visible when y < 10−5 .

Riesz mean

The Riesz mean of the von Mangoldt function is given by Here, λ and δ are numbers characterizing the Riesz mean. One must take c > 1 . The sum over ρ is the sum over the zeroes of the Riemann zeta function, and can be shown to be a convergent series for λ > 1 .

Approximation by Riemann zeta zeros

There is an explicit formula for the summatory Mangoldt function \psi(x) given by If we separate out the trivial zeros of the zeta function, which are the negative even integers, we obtain (The sum is not absolutely convergent, so we take the zeros in order of the absolute value of their imaginary part.) In the opposite direction, in 1911 E. Landau proved that for any fixed t > 1 (We use the notation ρ = β + iγ for the non-trivial zeros of the zeta function.) Therefore, if we use Riemann notation α = −i(ρ − 1/2) we have that the sum over nontrivial zeta zeros expressed as peaks at primes and powers of primes. The Fourier transform of the von Mangoldt function gives a spectrum with spikes at ordinates equal to the imaginary parts of the Riemann zeta function zeros. This is sometimes called a duality.

Generalized von Mangoldt function

The functions where \mu denotes the Möbius function and k denotes a positive integer, generalize the von Mangoldt function. The function \Lambda_1 is the ordinary von Mangoldt function \Lambda.