Landau proved, for any fixed $x>1$, that $$\sum_{0<\gamma\leq T} x^\rho = -\frac{T}{2\pi} \Lambda(x)+ O(\log T) \quad \text{for} \quad T\to \infty,$$ where $\rho$ runs over the non-trivial zeros of the Riemann zeta function $\zeta(s)$ and $\Lambda(x) =\log p$ if $x=p^m,\ p$ prime and $\Lambda(x) =0$ otherwise. Recently Gonek has obtained a form of the previous formula which is uniform in $T$ and $x$. Here we furnish a uniform version of Landau's formula in which the error term has sharper individual and mean-square estimates
Let's define $\delta(x) = (\sum_{{q\leq x}}{\frac{1}{q}}-\log \log x-B)$, where $B \approx 0.2614972...
The error term function for the mean square of the Riemann zeta-function $\zeta(s) $ in the strip $-...
A large literature exists relating Riemann’s zeta function ζ(s)=∑k=1 ∞ 1/ks,R(s)>1, and partial s...
Landau proved, for any fixed $x>1$, that $$\sum_{0<\gamma\leq T} x^\rho = -\frac{T}{2\pi} \Lambda(...
Abstract. E. Landau gave an interesting asymptotic formula for a sum in-volving zeros of the Riemann...
Let f(z) = a0 + a1z + ... be holomorphic in the unit disk {z: Absolute value of z <1} and omit th...
The Landau function g(n) is the maximal order of an element of the symmetric group of degree n; it i...
In 1909, Landau showed that \[\limsup \tfrac{n}{\phi(n) \log\log{n}} = e^\gamma,\] where $\phi(n)$ ...
A summability theorem of Landau, which classically is a simple consequence of the uniform boundednes...
The Riemann zeta function has a deep connection to the distribution of primes. In 1911 Landau proved...
The Riemann Hypothesis is a conjecture that the Riemann zeta function has its zeros only at the nega...
AbstractThe constants of Landau and Lebesgue are defined for all integers n⩾0 byGn=∑k=0n116k2kk2andL...
© 2020, Springer-Verlag GmbH Germany, part of Springer Nature. In this article we estimate the sum o...
We examine the Landau constants defined by G(n) := Sigma(n)(m=0) 1/2(4m) ((m) (2m))(2) (n = 0, 1, 2,...
AbstractLet h(s) = π−12sΓ(12s) ζ(s). A formula of Riemann [1; 2, §2.10] is h(s) = π−12sΓ(12s)f1(s) +...
Let's define $\delta(x) = (\sum_{{q\leq x}}{\frac{1}{q}}-\log \log x-B)$, where $B \approx 0.2614972...
The error term function for the mean square of the Riemann zeta-function $\zeta(s) $ in the strip $-...
A large literature exists relating Riemann’s zeta function ζ(s)=∑k=1 ∞ 1/ks,R(s)>1, and partial s...
Landau proved, for any fixed $x>1$, that $$\sum_{0<\gamma\leq T} x^\rho = -\frac{T}{2\pi} \Lambda(...
Abstract. E. Landau gave an interesting asymptotic formula for a sum in-volving zeros of the Riemann...
Let f(z) = a0 + a1z + ... be holomorphic in the unit disk {z: Absolute value of z <1} and omit th...
The Landau function g(n) is the maximal order of an element of the symmetric group of degree n; it i...
In 1909, Landau showed that \[\limsup \tfrac{n}{\phi(n) \log\log{n}} = e^\gamma,\] where $\phi(n)$ ...
A summability theorem of Landau, which classically is a simple consequence of the uniform boundednes...
The Riemann zeta function has a deep connection to the distribution of primes. In 1911 Landau proved...
The Riemann Hypothesis is a conjecture that the Riemann zeta function has its zeros only at the nega...
AbstractThe constants of Landau and Lebesgue are defined for all integers n⩾0 byGn=∑k=0n116k2kk2andL...
© 2020, Springer-Verlag GmbH Germany, part of Springer Nature. In this article we estimate the sum o...
We examine the Landau constants defined by G(n) := Sigma(n)(m=0) 1/2(4m) ((m) (2m))(2) (n = 0, 1, 2,...
AbstractLet h(s) = π−12sΓ(12s) ζ(s). A formula of Riemann [1; 2, §2.10] is h(s) = π−12sΓ(12s)f1(s) +...
Let's define $\delta(x) = (\sum_{{q\leq x}}{\frac{1}{q}}-\log \log x-B)$, where $B \approx 0.2614972...
The error term function for the mean square of the Riemann zeta-function $\zeta(s) $ in the strip $-...
A large literature exists relating Riemann’s zeta function ζ(s)=∑k=1 ∞ 1/ks,R(s)>1, and partial s...