\begin{table}%t3
\caption{\label{table3}Results of the fully aperiodic simulations for the preassigned significance levels $\gamma=0.01$ and~0.001.} 
%\centering
\small
\begin{tabular}{c|cc|cc|cc|cc}
\hline\hline
    & \multicolumn{2}{|c|}{$H_1$} & 
      \multicolumn{2}{|c|}{$H_2$} &
      \multicolumn{2}{|c|}{$H_3$} & 
      \multicolumn{2}{|c}{$H_4$} \\
    & \multicolumn{2}{|c|}{$F_{{{\rm AP}}}(t,S=1,\sigma_{{P}}=0.05)$} & 
      \multicolumn{2}{|c|}{$F_{{{\rm AP}}}(t,S=1,\sigma_{{P}}=0.10)$} & 
      \multicolumn{2}{|c|}{$F_{{{\rm AP}}}(t,S=1,\sigma_{{P}}=0.20)$} & 
      \multicolumn{2}{|c}{$F_{{{\rm AP}}}(t,S=1,\sigma_{{P}}=0.30)$} \\  
     & $\gamma=0.01$              & $\gamma=0.001$       & 
       $\gamma=0.01$              &  $\gamma=0.001$      &
       $\gamma=0.01$              & $\gamma=0.001$       & 
       $\gamma=0.01$              &  $\gamma=0.001$      \\
$n$ & $ P(z \ge z_{0})  < \gamma$ & $P(z \ge z_{0}) < \gamma$ & $P(z \ge z_{0}) < \gamma$ &  $P(z \ge z_{0}) < \gamma$ &
      $ P(z \ge z_{0}) < \gamma$  & $P(z \ge z_{0}) < \gamma$ & $P(z \ge z_{0}) < \gamma$ &  $P(z \ge z_{0}) < \gamma$ \\
\hline 
10 &$z_0=6.88 $&$z_0=8.12 $&$z_0=6.84$&$z_0=8.12 $&$z_0=6.84$&$z_0=8.12 $&$z_0=6.82$&$z_0=8.02 $\\
25 &$z_0=7.75 $&$z_0=9.80 $&$z_0=7.73$&$z_0=9.80 $&$z_0=7.67$&$z_0=9.68 $&$z_0=7.63$&$z_0=9.68 $\\
50 &$z_0=8.33 $&$z_0=10.71$&$z_0=8.20$&$z_0=10.47$&$z_0=8.04$&$z_0=10.21$&$z_0=7.94$&$z_0=10.22$\\
75 &$z_0=8.59 $&$z_0=10.98$&$z_0=8.48$&$z_0=11.01$&$z_0=8.18$&$z_0=10.41$&$z_0=8.04$&$z_0=10.38$\\
100&$z_0=8.82 $&$z_0=11.42$&$z_0=8.70$&$z_0=11.18$&$z_0=8.35$&$z_0=10.82$&$z_0=8.10$&$z_0=10.52$\\
200&$z_0=9.81$&$z_0=12.71$&$z_0=9.51$&$z_0=12.25$&$z_0=8.83$&$z_0=11.41$&$z_0=8.34$&$z_0=10.70$\\
\hline
\end{tabular}
\end{table}