Computations of the Riemann zeta function

These pages sorted by the size of $t$

These pages sorted by the size of $Z(t)$

These pages sorted by the size of $S(t)$

Here are some pictures of and information about $Z(t)$ and $S(t)$ for some large values of $t$. The $Z$ function is the zeta function on the critical line, rotated so that it is real, so \[ Z(t) = e^{i Arg(\zeta(1/2 + it)} \zeta(1/2 + it) \] $S(t)$ is the argument of $\zeta(1/2 + it)$, properly interpreted. In some way, it measures irregularity in the distribution of the zeros of the zeta function.

These are from computations run by Ghaith Hiary and myself, based on the algorithm described in Ghaith's paper (also available at the arXiv). These computations have been run on a variety of machines. Initially, we used machines on the Sage cluster at the University of Washington (thanks to William Stein and the NSF), then later the riemann cluster at University of Waterloo (thanks to Mike Rubinstein). Currently, computations are being run at the University of Bristol on the LMFDB machines (funded by EPSRC) and on BlueCrystal.

If your web browser window is big enough, in the top right of each section below you will see a plot of Z(t), in the bottom left you will see S(t), and in the bottom right you will see a zoomed in plot of Z(t). Things are sized roughly so that this looks good on my 1080p monitor.

The images are all links that will take you to a zoomable version of the plot.

You can click on any image for a bigger version. Also, you can look at a list of all of the images: Z(t) or S(t).

See also:

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Page 15


$\zeta(1/2 + it)$ around $t = 10000000000000000000000001000 \approx 1.0 \times 10^{ 28 }$

Largest value of $Z(t)$ in this graph:43.7245665

Value of $t$ for which the maximum occurs:10000000000000000000000001014.82201172

Value of $\zeta(1/2 + it)$:$36.95095938 + 23.37657623i$

Maximum of $S(t)$ in this range:-1.731371566

zeta function picture

zeta function picture zeta function picture


$\zeta(1/2 + it)$ around $t = 10000000000000000000000000960 \approx 1.0 \times 10^{ 28 }$

Largest value of $Z(t)$ in this graph:-85.00570725

Value of $t$ for which the maximum occurs:10000000000000000000000000991.86299609

Value of $\zeta(1/2 + it)$:$84.01721554 + 12.92585619i$

Maximum of $S(t)$ in this range:1.743819836

zeta function picture

zeta function picture zeta function picture


$\zeta(1/2 + it)$ around $t = 10000000000000000000000000920 \approx 1.0 \times 10^{ 28 }$

Largest value of $Z(t)$ in this graph:263.1295123

Value of $t$ for which the maximum occurs:10000000000000000000000000928.548996094

Value of $\zeta(1/2 + it)$:$212.8902123 + 154.6444237i$

Maximum of $S(t)$ in this range:1.747703799

zeta function picture

zeta function picture zeta function picture


$\zeta(1/2 + it)$ around $t = 10000000000000000000000000880 \approx 1.0 \times 10^{ 28 }$

Largest value of $Z(t)$ in this graph:67.09025324

Value of $t$ for which the maximum occurs:10000000000000000000000000882.400996094

Value of $\zeta(1/2 + it)$:$50.25310942 + 44.44915155i$

Maximum of $S(t)$ in this range:-2.182406801

zeta function picture

zeta function picture zeta function picture


$\zeta(1/2 + it)$ around $t = 10000000000000000000000000840 \approx 1.0 \times 10^{ 28 }$

Largest value of $Z(t)$ in this graph:84.61591928

Value of $t$ for which the maximum occurs:10000000000000000000000000865.94726172

Value of $\zeta(1/2 + it)$:$59.63151142 + 60.03279639i$

Maximum of $S(t)$ in this range:-1.758558634

zeta function picture

zeta function picture zeta function picture


$\zeta(1/2 + it)$ around $t = 10000000000000000000000000800 \approx 1.0 \times 10^{ 28 }$

Largest value of $Z(t)$ in this graph:128.6447034

Value of $t$ for which the maximum occurs:10000000000000000000000000837.72599609

Value of $\zeta(1/2 + it)$:$30.94500508 - 124.8673952i$

Maximum of $S(t)$ in this range:-1.862715466

zeta function picture

zeta function picture zeta function picture


$\zeta(1/2 + it)$ around $t = 10000000000000000000000000760 \approx 1.0 \times 10^{ 28 }$

Largest value of $Z(t)$ in this graph:100.4374854

Value of $t$ for which the maximum occurs:10000000000000000000000000764.441996094

Value of $\zeta(1/2 + it)$:$93.89087721 + 35.66779576i$

Maximum of $S(t)$ in this range:1.798959285

zeta function picture

zeta function picture zeta function picture


$\zeta(1/2 + it)$ around $t = 10000000000000000000000000720 \approx 1.0 \times 10^{ 28 }$

Largest value of $Z(t)$ in this graph:44.53024412

Value of $t$ for which the maximum occurs:10000000000000000000000000756.84548047

Value of $\zeta(1/2 + it)$:$39.16416284 - 21.19223891i$

Maximum of $S(t)$ in this range:-1.726287334

zeta function picture

zeta function picture zeta function picture


$\zeta(1/2 + it)$ around $t = 10000000000000000000000000680 \approx 1.0 \times 10^{ 28 }$

Largest value of $Z(t)$ in this graph:167.7062212

Value of $t$ for which the maximum occurs:10000000000000000000000000710.67737891

Value of $\zeta(1/2 + it)$:$163.3093428 + 38.15016595i$

Maximum of $S(t)$ in this range:1.820897073

zeta function picture

zeta function picture zeta function picture


$\zeta(1/2 + it)$ around $t = 10000000000000000000000000640 \approx 1.0 \times 10^{ 28 }$

Largest value of $Z(t)$ in this graph:-54.15462849

Value of $t$ for which the maximum occurs:10000000000000000000000000656.01299609

Value of $\zeta(1/2 + it)$:$54.15462729 - 0.01142650706i$

Maximum of $S(t)$ in this range:-1.995594207

zeta function picture

zeta function picture zeta function picture