\begin{table}%t5
    \caption{Coupled modes found for the $i2$~models with $\Omega=52.6~\kms$ (see Table~\ref{tab:rotmodels}). The mode identification is given by its radial order~$n$, spherical degree~$\ell$, and azimuthal order~$m$. $\sigma_a$ and~$\sigma_b$ (in~$\mu{\rm Hz}$) represent the oscillation frequency. $\beta_j$~is the contamination coefficient (see text for definition).}\label{tab:degmodes}
%\centering
\small
    \begin{tabular}{cccccc}
    \hline
    \hline
& & & & & \\[-8pt]
    Model & $n_a$, $\ell_a$, $m_a$ & $\sigma_a$ & $n_b$, $\ell_b$, $m_b$ & $\sigma_b$  & $\beta_j$ \\
& & & & & \\[-8pt]
      \hline
      02 & --1, 1, 1 & 127.63 & --4, 3, 1 & 128.24 & 0.18 \\
      02 & --1, 1, 0 & 133.52 & --4, 3, 0 & 133.97 & 0.17 \\
      02 & --4, 3, 1 & 116.27 & --1, 1, 1 & 116.88 & 0.82 \\
      02 & --4, 3, 0 & 131.00 & --1, 1, 0 & 131.45 & 0.83 \\
      \hline
      12 & 4, 0, 0 & 159.37 & 1, 2, 0 & 160.17 & 0.20 \\
      12 & 2, 1, 1 & 159.16 & 0, 3, 1 & 160.33 & 0.11 \\
      12 & 2, 1, --1 & 166.07 & 0, 3, --1 & 167.11 & 0.21 \\
      12 & 1, 2, 0 & 158.12 & 4, 0, 0 & 158.92 & 0.80 \\
      12 & 0, 3, 1 & 155.91 & 2, 1, 1 & 157.08 & 0.89 \\
      12 & 0, 3, --1 & 162.56 & 2, 1, --1 & 163.6 & 0.79 \\
      \hline
      22 & 4, 0, 0 & 159.95 & 1, 2, 0 & 160.27 & 0.20 \\
      22 & 2, 1, --1 & 164.95 & 0, 3, --1 & 166.07 & 0.15 \\
      22 & 2, 1, 1 & 157.89 & 0, 3, 1 & 159.19 & 0.11 \\
      22 & 1, 2, 0 & 159.15 & 4, 0, 0 & 159.47 & 0.80 \\
      22 & --2, 3, 1 & 129.53 & --3, 1, 1 & 130.52 & 0.87 \\
      22 & 0, 3, --1 & 162.10 & 2, 1, --1 & 163.18 & 0.85 \\
      22 & 0, 3, 1 & 155.38 & 2, 1, 1 & 156.68 & 0.89 \\
      \hline
      42 & --2, 1, 1 & 120.94 & --2, 1, 1 & 124.51 & 0.24 \\
      42 & --5, 3, 1 & 123.91 & --2, 1, 1 & 127.48 & 0.76 \\
      \hline
    \end{tabular}
\end{table}