Here is the final graph; It finished compiling.
\[
\zeta_G(s)\\
\]
For \(0 \le \Re(s) \le 5\) and \(-2.5 \le \Im(s) \le 2.5\). This graph is at least \(4\)-digit accuracy.
Blackholes are zeroes. Intensity towards white is magnitude toward infinity. As \(|s| \to \infty\) we have \(\zeta_G \to 1\). Phase is mapped as red towards real; and blue towards negative... The colour coding is representative of the imaginary arguments.
\[
\zeta_G(s)\\
\]
For \(0 \le \Re(s) \le 5\) and \(-2.5 \le \Im(s) \le 2.5\). This graph is at least \(4\)-digit accuracy.
Blackholes are zeroes. Intensity towards white is magnitude toward infinity. As \(|s| \to \infty\) we have \(\zeta_G \to 1\). Phase is mapped as red towards real; and blue towards negative... The colour coding is representative of the imaginary arguments.
