Authorea

\label{appendixtable}Oscillation modes in KIC 9246715 fit with Diamonds.


Frequency
\((\ell,m)\)
Amplitude or HeightaaAn amplitude is measured when the peak is a resolved Lorentzian, while height is measured instead when the peak is an unresolved Sinc\({}^{2}\) function. Linewidth is not defined in the latter case.
Linewidth
Detection ProbabilitybbValues of 0.99 and above are ensured to be significant.

(\(\mu\rm{Hz}\))

(ppm) or (ppm\({}^{2}\ \mu\rm{Hz}^{-1}\))
(\(\mu\rm{Hz}\))


\(76.50\pm 0.01\)
(0, 0)
\(5.2\pm 0.4\)
\(0.61\pm 0.05\)
0.91

\(84.43\pm 0.02\)
(0, 0)
\(10.9\pm 0.4\)
\(0.60\pm 0.05\)
1.00

\(92.54\pm 0.01\)
(0, 0)
\(13.2\pm 0.3\)
\(0.36\pm 0.02\)
1.00

\(100.75\pm 0.02\)
(0, 0)
\(15.7\pm 0.6\)
\(0.60\pm 0.07\)
1.00

\(109.06\pm 0.01\)
(0, 0)
\(14.6\pm 0.4\)
\(0.46\pm 0.03\)
1.00

\(117.37\pm 0.01\)
(0, 0)
\(12.6\pm 0.4\)
\(0.30\pm 0.02\)
1.00

\(125.92\pm 0.04\)
(0, 0)
\(9.8\pm 0.7\)
\(0.48\pm 0.07\)
1.00

\(134.53\pm 0.02\)
(0, 0)
\(9.1\pm 0.7\)
\(0.91\pm 0.07\)
1.00

\(87.714\pm 0.001\)
(1, ?)
\(402\begin{subarray}{c}+11\\
-12\end{subarray}\)

0.97

\(88.40\pm 0.01\)
(1, -1)
\(1.6\pm 0.1\)
\(0.088\pm 0.006\)
0.75

\(88.70\pm 0.01\)
(1, 1)
\(5.0\pm 0.2\)
\(0.26\pm 0.02\)
0.99

\(89.19\pm 0.01\)
(1, -1)
\(1.7\pm 0.1\)
\(0.17\pm 0.01\)
0.585

\(89.422\pm 0.001\)
(1, 1)
\(461\begin{subarray}{c}+11\\
-12\end{subarray}\)

0.99

\(96.12\pm 0.01\)
(1, 1)
\(2.8\pm 0.5\)
\(0.10\pm 0.01\)
0.90

\(96.62\pm 0.02\)
(1, -1)
\(7.6\pm 1.0\)
\(0.35\pm 0.06\)
0.56

\(97.00\pm 0.03\)
(1, 1)
\(7.9\pm 1.0\)
\(0.34\pm 0.05\)
0.80

\(103.26\pm 0.01\)
(1, -1)
\(3.7\pm 0.2\)
\(0.23\pm 0.02\)
0.19

\(103.66\pm 0.01\)
(1, 1)
\(6.3\pm 0.4\)
\(0.33\pm 0.03\)
0.10

\(104.67\pm 0.01\)
(1, -1)
\(6.1\pm 0.3\)
\(0.17\pm 0.01\)
1.00

\(105.04\pm 0.01\)
(1, 1)
\(8.7\pm 0.4\)
\(0.18\pm 0.02\)
1.00

\(105.50\pm 0.01\)
(1, -1)
\(5.9\pm 0.3\)
\(0.14\pm 0.01\)
0.99

\(105.89\pm 0.01\)
(1, 1)
\(8.4\pm 0.5\)
\(0.33\pm 0.03\)
1.00

\(111.940\pm 0.001\)
(1, -1)
\(435\begin{subarray}{c}+16\\
-33\end{subarray}\)

0.99

\(112.28\pm 0.01\)
(1, 1)
\(3.5\pm 0.3\)
\(0.19\pm 0.02\)
0.79

\(113.13\pm 0.01\)
(1, -1)
\(7.7\pm 0.4\)
\(0.14\pm 0.01\)
1.00

\(113.39\pm 0.01\)
(1, 1)
\(12.3\pm 0.5\)
\(0.25\pm 0.02\)
1.00

\(114.74\pm 0.01\)
(1, ?)
\(2.9\pm 0.2\)
\(0.01\pm 0.01\)
0.93

\(120.59\pm 0.03\)
(1, 1)
\(5.4\pm 0.7\)
\(0.39\pm 0.10\)
0.99

\(121.60\pm 0.01\)
(1, -1)
\(6.8\pm 0.6\)
\(0.12\pm 0.02\)
0.99

\(121.88\pm 0.02\)
(1, 1)
\(9.6\pm 0.6\)
\(0.28\pm 0.04\)
1.00

\(122.74\pm 0.02\)
(1, -1)
\(4.3\pm 0.4\)
\(0.16\pm 0.03\)
0.99

\(123.101\pm 0.003\)
(1, 1)
\(347\begin{subarray}{c}+36\\
-29\end{subarray}\)

1.00

\(128.53\pm 0.01\)
(1, ?)
\(3.2\pm 0.3\)
\(0.10\pm 0.01\)
0.98

\(129.23\pm 0.01\)
(1, -1)
\(3.7\pm 0.4\)
\(0.11\pm 0.01\)
0.98

\(129.52\pm 0.02\)
(1, 1)
\(1.3\pm 0.1\)
\(0.07\pm 0.01\)
0.62

\(129.95\pm 0.02\)
(1, -1)
\(6.0\pm 0.3\)
\(0.32\pm 0.05\)
0.56

\(130.20\pm 0.01\)
(1, 1)
\(4.8\pm 0.3\)
\(0.16\pm 0.02\)
0.15

\(130.47\pm 0.02\)
(1, -1)
\(3.9\pm 0.3\)
\(0.19\pm 0.03\)
0.72

\(130.74\pm 0.02\)
(1, 1)
\(6.1\pm 0.5\)
\(0.29\pm 0.05\)
0.99

\(131.14\pm 0.02\)
(1, -1)
\(1.7\pm 0.1\)
\(0.08\pm 0.01\)
0.13

\(137.30\pm 0.03\)
(1, -1)
\(5.0\pm 0.7\)
\(0.41\pm 0.13\)
0.97

\(137.74\pm 0.07\)
(1, 1)
\(3.3\pm 0.8\)
\(0.53\pm 0.18\)
0.31

\(138.65\pm 0.04\)
(1, -1)
\(7.7\pm 0.9\)
\(1.10\pm 0.26\)
1.00

\(139.06\pm 0.02\)
(1, 1)
\(4.2\pm 0.5\)
\(0.13\pm 0.03\)
0.99

\(91.84\pm 0.01\)
(2, 0)
\(1.7\pm 0.1\)
\(0.25\pm 0.02\)
0.63

\(99.63\pm 0.04\)
(2, 0)
\(11.1\pm 1.0\)
\(0.82\pm 0.11\)
1.00

\(108.24\pm 0.02\)
(2, 0)
\(11.6\pm 1.2\)
\(0.78\pm 0.11\)
1.00

\(116.54\pm 0.01\)
(2, 0)
\(13.3\pm 0.5\)
\(1.00\pm 0.08\)
1.00

\(125.06\pm 0.03\)
(2, 0)
\(10.8\pm 0.8\)
\(0.84\pm 0.15\)
1.00

\(133.35\pm 0.02\)
(2, 0)
\(9.3\pm 0.6\)
\(0.85\pm 0.09\)
1.00

\(86.01\pm 0.01\)
(3, 0)
\(3.1\pm 0.1\)
\(0.27\pm 0.02\)
0.68

Frequency	\((\ell,m)\)	Amplitude or Height^a^aAn amplitude is measured when the peak is a resolved Lorentzian, while height is measured instead when the peak is an unresolved Sinc\({}^{2}\) function. Linewidth is not defined in the latter case.	Linewidth	Detection Probability^b^bValues of 0.99 and above are ensured to be significant.
(\(\mu\rm{Hz}\))		(ppm) or (ppm\({}^{2}\ \mu\rm{Hz}^{-1}\))	(\(\mu\rm{Hz}\))
\(76.50\pm 0.01\)	(0, 0)	\(5.2\pm 0.4\)	\(0.61\pm 0.05\)	0.91
\(84.43\pm 0.02\)	(0, 0)	\(10.9\pm 0.4\)	\(0.60\pm 0.05\)	1.00
\(92.54\pm 0.01\)	(0, 0)	\(13.2\pm 0.3\)	\(0.36\pm 0.02\)	1.00
\(100.75\pm 0.02\)	(0, 0)	\(15.7\pm 0.6\)	\(0.60\pm 0.07\)	1.00
\(109.06\pm 0.01\)	(0, 0)	\(14.6\pm 0.4\)	\(0.46\pm 0.03\)	1.00
\(117.37\pm 0.01\)	(0, 0)	\(12.6\pm 0.4\)	\(0.30\pm 0.02\)	1.00
\(125.92\pm 0.04\)	(0, 0)	\(9.8\pm 0.7\)	\(0.48\pm 0.07\)	1.00
\(134.53\pm 0.02\)	(0, 0)	\(9.1\pm 0.7\)	\(0.91\pm 0.07\)	1.00
\(87.714\pm 0.001\)	(1, ?)	\(402\begin{subarray}{c}+11\\ -12\end{subarray}\)		0.97
\(88.40\pm 0.01\)	(1, -1)	\(1.6\pm 0.1\)	\(0.088\pm 0.006\)	0.75
\(88.70\pm 0.01\)	(1, 1)	\(5.0\pm 0.2\)	\(0.26\pm 0.02\)	0.99
\(89.19\pm 0.01\)	(1, -1)	\(1.7\pm 0.1\)	\(0.17\pm 0.01\)	0.585
\(89.422\pm 0.001\)	(1, 1)	\(461\begin{subarray}{c}+11\\ -12\end{subarray}\)		0.99
\(96.12\pm 0.01\)	(1, 1)	\(2.8\pm 0.5\)	\(0.10\pm 0.01\)	0.90
\(96.62\pm 0.02\)	(1, -1)	\(7.6\pm 1.0\)	\(0.35\pm 0.06\)	0.56
\(97.00\pm 0.03\)	(1, 1)	\(7.9\pm 1.0\)	\(0.34\pm 0.05\)	0.80
\(103.26\pm 0.01\)	(1, -1)	\(3.7\pm 0.2\)	\(0.23\pm 0.02\)	0.19
\(103.66\pm 0.01\)	(1, 1)	\(6.3\pm 0.4\)	\(0.33\pm 0.03\)	0.10
\(104.67\pm 0.01\)	(1, -1)	\(6.1\pm 0.3\)	\(0.17\pm 0.01\)	1.00
\(105.04\pm 0.01\)	(1, 1)	\(8.7\pm 0.4\)	\(0.18\pm 0.02\)	1.00
\(105.50\pm 0.01\)	(1, -1)	\(5.9\pm 0.3\)	\(0.14\pm 0.01\)	0.99
\(105.89\pm 0.01\)	(1, 1)	\(8.4\pm 0.5\)	\(0.33\pm 0.03\)	1.00
\(111.940\pm 0.001\)	(1, -1)	\(435\begin{subarray}{c}+16\\ -33\end{subarray}\)		0.99
\(112.28\pm 0.01\)	(1, 1)	\(3.5\pm 0.3\)	\(0.19\pm 0.02\)	0.79
\(113.13\pm 0.01\)	(1, -1)	\(7.7\pm 0.4\)	\(0.14\pm 0.01\)	1.00
\(113.39\pm 0.01\)	(1, 1)	\(12.3\pm 0.5\)	\(0.25\pm 0.02\)	1.00
\(114.74\pm 0.01\)	(1, ?)	\(2.9\pm 0.2\)	\(0.01\pm 0.01\)	0.93
\(120.59\pm 0.03\)	(1, 1)	\(5.4\pm 0.7\)	\(0.39\pm 0.10\)	0.99
\(121.60\pm 0.01\)	(1, -1)	\(6.8\pm 0.6\)	\(0.12\pm 0.02\)	0.99
\(121.88\pm 0.02\)	(1, 1)	\(9.6\pm 0.6\)	\(0.28\pm 0.04\)	1.00
\(122.74\pm 0.02\)	(1, -1)	\(4.3\pm 0.4\)	\(0.16\pm 0.03\)	0.99
\(123.101\pm 0.003\)	(1, 1)	\(347\begin{subarray}{c}+36\\ -29\end{subarray}\)		1.00
\(128.53\pm 0.01\)	(1, ?)	\(3.2\pm 0.3\)	\(0.10\pm 0.01\)	0.98
\(129.23\pm 0.01\)	(1, -1)	\(3.7\pm 0.4\)	\(0.11\pm 0.01\)	0.98
\(129.52\pm 0.02\)	(1, 1)	\(1.3\pm 0.1\)	\(0.07\pm 0.01\)	0.62
\(129.95\pm 0.02\)	(1, -1)	\(6.0\pm 0.3\)	\(0.32\pm 0.05\)	0.56
\(130.20\pm 0.01\)	(1, 1)	\(4.8\pm 0.3\)	\(0.16\pm 0.02\)	0.15
\(130.47\pm 0.02\)	(1, -1)	\(3.9\pm 0.3\)	\(0.19\pm 0.03\)	0.72
\(130.74\pm 0.02\)	(1, 1)	\(6.1\pm 0.5\)	\(0.29\pm 0.05\)	0.99
\(131.14\pm 0.02\)	(1, -1)	\(1.7\pm 0.1\)	\(0.08\pm 0.01\)	0.13
\(137.30\pm 0.03\)	(1, -1)	\(5.0\pm 0.7\)	\(0.41\pm 0.13\)	0.97
\(137.74\pm 0.07\)	(1, 1)	\(3.3\pm 0.8\)	\(0.53\pm 0.18\)	0.31
\(138.65\pm 0.04\)	(1, -1)	\(7.7\pm 0.9\)	\(1.10\pm 0.26\)	1.00
\(139.06\pm 0.02\)	(1, 1)	\(4.2\pm 0.5\)	\(0.13\pm 0.03\)	0.99
\(91.84\pm 0.01\)	(2, 0)	\(1.7\pm 0.1\)	\(0.25\pm 0.02\)	0.63
\(99.63\pm 0.04\)	(2, 0)	\(11.1\pm 1.0\)	\(0.82\pm 0.11\)	1.00
\(108.24\pm 0.02\)	(2, 0)	\(11.6\pm 1.2\)	\(0.78\pm 0.11\)	1.00
\(116.54\pm 0.01\)	(2, 0)	\(13.3\pm 0.5\)	\(1.00\pm 0.08\)	1.00
\(125.06\pm 0.03\)	(2, 0)	\(10.8\pm 0.8\)	\(0.84\pm 0.15\)	1.00
\(133.35\pm 0.02\)	(2, 0)	\(9.3\pm 0.6\)	\(0.85\pm 0.09\)	1.00
\(86.01\pm 0.01\)	(3, 0)	\(3.1\pm 0.1\)	\(0.27\pm 0.02\)	0.68