Detail

\[ \zeta(s) = \sum_{n=1}^\infty\frac{1}{n^s} \] \[ \sigma_1 = \left( \matrix{ 0 & 1 \cr 1 & 0 } \right), \sigma_2 = \left( \matrix{ 0 & -i \cr i & 0 } \right), \sigma_3 = \left( \matrix{ 1 & 0 \cr 0 & -1} \right) は,以下の式を満たす. \left[ \frac{\sigma_i}{2}~,~\frac{\sigma_j}{2} \right] = i\varepsilon_{ijk} \frac{\sigma_k}{2} \] \[ X+Y \overset{k_{unbind}}{\underset{k_{bind}}{\rightleftharpoons}} Z \] \begin{cases} \dot{x}=a-bx-k_{bind}xy+k_{unbind}z & \\ \dot{y}=1-y-k_{bind}xy+k_{unbind}z & \\ \dot{z}=k_{bind}xy-k_{unbind}z-cz & \end{cases} \[ y=\frac{1}{2} \biggl\{ \sqrt{(a-1+\frac{b}{\gamma})^2 +4 \frac{b}{\gamma}} \biggl\}　\] \root{} - (a-1+\frac{b}{\gamma}) \right]