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Another frequency table, on a smaller frequency range, but which is more precised as it takes into account mode asymmetry and a longer time series
Frequencies and 1 sigma errors, in µHz, as measured by GOLF instrument, taking into account the asymmetry of the modes (published in thiery et al.).
n l=0 l=1 l=2 l=3 12 1945.756 ± 0.033 13 1957.432 ± 0.031 2020.839 ± 0.033 2082.098 ± 0.051 2137.712 ± 0.062 14 2093.514 ± 0.032 2156.806 ± 0.034 2217.747 ± 0.047 2273.417 ± 0.100 15 2228.837 ± 0.040 2292.053 ± 0.042 2352.318 ± 0.042 2407.644 ± 0.103 16 2362.835 ± 0.047 2425.569 ± 0.046 2485.859 ± 0.055 2541.558 ± 0.073 17 2496.204 ± 0.044 2559.250 ± 0.048 2619.626 ± 0.043 2676.233 ± 0.064 18 2629.744 ± 0.036 2693.401 ± 0.043 2754.479 ± 0.046 2811.448 ± 0.053 19 2764.161 ± 0.036 2828.169 ± 0.048 2889.581 ± 0.043 2946.981 ± 0.051 20 2899.069 ± 0.039 2963.307 ± 0.039 3024.712 ± 0.046 3082.228 ± 0.063 21 3033.768 ± 0.035 3098.180 ± 0.049 3159.857 ± 0.045 3217.825 ± 0.058 22 3168.658 ± 0.039 3233.138 ± 0.052 3295.136 ± 0.063 3353.849 ± 0.168 23 3303.388 ± 0.051 3368.560 ± 0.070 3430.804 ± 0.086 3489.789 ± 0.208 24 3439.047 ± 0.068 3504.100 ± 0.085 3566.874 ± 0.138 3626.203 ± 0.283 25 3574.800 ± 0.107 3640.367 ± 0.117