\begin{table}[htbp]\centering\caption{Rejection probabilities: $\alpha = 0.05$ ($2,000$ Monte Carlo iterations)}\renewcommand{\arraystretch}{1.0}\setlength{\tabcolsep}{2pt}\begin{tabular}{@{}c*{17}{c}@{}}\toprule& \multicolumn{17}{c}{$H_0 : \tilde g_1 =_d\tilde g_2$(Watts-Strogatz(2,0.3), $U_{ic} \sim \text{Unif}[-4,4]$, $\theta=(0,2,0,6,5,4)$)} \\& \multicolumn{17}{c}{$q$}  \\\cmidrule(lr){2-18}$C$ & 4 & 5 & 6 & 7 & 8 & 9 & 10 & 11 & 12 & 13 &14 & 15 & 16 & 17 & 18 & 19 & 20  \\\midrule20&82.8&92.3&94.5&96.8&97.9&98.9&99.6& & & & & & & & & & \\50&82.0&94.0&97.0&99.2&99.6&99.8&99.9&100.0&100.0&100.0&100.0&100.0&100.0&100.0&100.0&100.0&100.0\\100&82.5&93.5&97.1&99.0&99.3&99.7&99.8&100.0&100.0&100.0&100.0&100.0&100.0&100.0&100.0&100.0&100.0\\200&83.4&94.5&97.2&99.1&99.6&99.8&99.9&100.0&100.0&100.0&100.0&100.0&100.0&100.0&100.0&100.0&100.0\\\midrule& \multicolumn{17}{c}{$H_0 : \tilde g_1 =_d\tilde g_3$(Watts-Strogatz(2,0.3), $U_{ic} \sim \text{Unif}[-4,4]$, $\theta=(0,2,0,6,5,4)$)} \\\midrule20&65.3&80.3&85.1&89.5&90.6&92.1&91.1& & & & & & & & & & \\50&63.0&80.5&88.0&93.7&96.8&98.4&99.2&99.8&99.9&100.0&100.0&100.0&100.0&100.0&100.0&100.0&100.0\\100&65.0&80.0&87.1&92.3&95.2&97.7&98.8&99.3&99.8&99.9&99.9&100.0&100.0&100.0&100.0&100.0&100.0\\200&64.9&81.1&88.0&93.0&95.9&97.2&98.7&99.4&99.7&99.8&99.9&99.9&99.9&100.0&100.0&100.0&100.0\\\midrule& \multicolumn{17}{c}{$H_0 : \tilde g_1 =_d\tilde g_4$(Watts-Strogatz(2,0.3), $U_{ic} \sim \text{Unif}[-4,4]$, $\theta=(0,2,0,6,5,4)$)} \\\midrule20&37.1&41.4&40.0&36.8&31.6&29.2&28.5& & & & & & & & & & \\50&44.8&60.7&67.7&74.6&79.0&82.8&85.1&86.2&86.2&85.1&83.5&81.7&79.9&77.3&75.1&72.7&69.8\\100&43.8&58.1&67.5&74.6&81.5&86.6&89.8&91.9&94.5&96.0&97.1&98.1&98.8&99.0&99.4&99.3&99.6\\200&45.2&57.9&67.6&76.4&81.8&87.7&90.1&93.1&94.7&96.2&97.5&98.2&98.8&99.3&99.8&99.9&99.9\\\midrule& \multicolumn{17}{c}{$H_0 : \tilde g_5 =_d\tilde g_6$(Watts-Strogatz(2,0.3), $U_{ic} \sim \text{Unif}[-4,4]$, $\theta=(0,2,0,6,5,4)$)} \\\midrule20&86.1&93.3&94.6&95.0&94.8&95.3&96.2& & & & & & & & & & \\50&83.0&94.5&97.6&99.1&99.9&99.8&100.0&100.0&100.0&100.0&100.0&100.0&100.0&100.0&100.0&100.0&100.0\\100&81.0&93.3&97.2&98.9&99.5&99.8&100.0&100.0&100.0&100.0&100.0&100.0&100.0&100.0&100.0&100.0&100.0\\200&84.4&94.4&97.7&99.2&99.8&99.8&99.8&100.0&100.0&100.0&100.0&100.0&100.0&100.0&100.0&100.0&100.0\\\midrule& \multicolumn{17}{c}{$H_0 : \tilde g_5 =_d\tilde g_7$(Watts-Strogatz(2,0.3), $U_{ic} \sim \text{Unif}[-4,4]$, $\theta=(0,2,0,6,5,4)$)} \\\midrule20&69.3&83.5&87.6&89.0&89.2&89.1&88.9& & & & & & & & & & \\50&66.3&81.7&89.2&94.8&97.7&99.0&99.6&99.9&100.0&99.9&100.0&100.0&100.0&99.9&100.0&99.9&99.9\\100&64.4&79.7&87.5&92.6&96.2&97.2&98.6&99.0&99.7&99.8&99.9&100.0&100.0&100.0&100.0&100.0&100.0\\200&65.1&80.4&86.2&92.5&96.1&97.6&98.8&99.5&99.6&99.9&100.0&100.0&100.0&100.0&100.0&100.0&100.0\\\midrule& \multicolumn{17}{c}{$H_0 : \tilde g_5 =_d\tilde g_8$(Watts-Strogatz(2,0.3), $U_{ic} \sim \text{Unif}[-4,4]$, $\theta=(0,2,0,6,5,4)$)} \\\midrule20&38.4&43.6&47.3&46.1&42.9&39.9&37.1& & & & & & & & & & \\50&42.4&56.9&64.8&70.2&74.8&79.3&82.5&85.5&87.8&89.5&90.3&90.5&89.5&88.7&87.2&86.1&84.9\\100&42.5&57.3&65.9&74.9&81.7&86.1&89.5&92.8&94.5&96.0&96.2&96.8&97.4&97.7&98.3&98.8&99.0\\200&43.5&57.6&67.4&74.8&81.2&87.0&90.5&92.7&95.2&97.2&98.0&98.4&98.9&99.2&99.6&99.7&99.8\\\bottomrule\end{tabular}\label{tab:rej_prob_power_654}\end{table}