Free Access
Table 4
Theoretical frequencies of the best-fitting model.
νmod(l,np,ng) | β k,l | νmod(l,np,ng) | β k,l | νmod(l,np,ng) | β k,l | νmod(l,np,ng) | β k,l | |||
(μHz) | (μHz) | (μHz) | (μHz) | |||||||
|
||||||||||
79.937(0, 0, 0) | 74.128(2, 0, −85) | 0.833 | 221.105(2, 6, −27) | 0.873 | 116.235(3, 1, −75) | 0.925 | ||||
103.356(0, 1, 0) | 75.014(2, 0, −84) | 0.834 | 225.913(2, 6, −26) | 0.888 | 117.557(3, 2, −75) | 0.923 | ||||
128.796(0, 2, 0) | 75.922(2, 0, −83) | 0.834 | 230.117(2, 6, −25) | 0.882 | 119.007(3, 2, −74) | 0.920 | ||||
154.668(0, 3, 0) | 76.841(2, 0, −82) | 0.836 | 236.592(2, 6, −24) | 0.855 | 120.572(3, 2, −73) | 0.919 | ||||
179.930(0, 4, 0) | 77.728(2, 0, −81) | 0.841 | 245.080(2, 6, −23) | 0.845 | 122.221(3, 2, −72) | 0.918 | ||||
204.942(0, 5, 0) | 78.510(2, 0, −80) | 0.850 | 253.222(2, 7, −23) | 0.923 | 123.923(3, 2, −71) | 0.918 | ||||
230.740(0, 6, 0) | 79.277(2, 0, −79) | 0.848 | 255.491(2, 7, −22) | 0.862 | 125.593(3, 2, −70) | 0.917 | ||||
257.460(0, 7, 0) | 80.189(2, 0, −78) | 0.842 | 265.949(2, 7, −21) | 0.838 | 126.824(3, 2, −69) | 0.918 | ||||
284.964(0, 8, 0) | 81.191(2, 0, −77) | 0.840 | 277.822(2, 8, −21) | 0.841 | 127.976(3, 2, −68) | 0.919 | ||||
313.007(0, 9, 0) | 82.234(2, 0, −76) | 0.840 | 281.162(2, 8, −20) | 0.953 | 129.714(3, 2, -67) | 0.919 | ||||
341.328(0,10, 0) | 83.301(2, 0, −75) | 0.841 | 291.148(2, 8, −19) | 0.837 | 131.609(3, 2, −66) | 0.919 | ||||
84.368(2, 0, −74) | 0.844 | 305.609(2, 9, −19) | 0.839 | 133.536(3, 2, −65) | 0.921 | |||||
73.770(1, 0, −49) | 0.506 | 85.377(2, 0, −73) | 0.851 | 309.331(2, 9, −18) | 0.962 | 135.400(3, 2, −64) | 0.926 | |||
75.163(1, 0, −48) | 0.506 | 86.294(2, 1, −73) | 0.851 | 321.765(2, 9, −17) | 0.836 | 137.101(3, 2, −63) | 0.931 | |||
76.709(1, 0, −47) | 0.507 | 87.298(2, 1, −72) | 0.842 | 337.707(2,10, −17) | 0.963 | 138.850(3, 2, −62) | 0.926 | |||
78.364(1, 0, −46) | 0.510 | 88.458(2, 1, −71) | 0.837 | 140.875(3, 2, −61) | 0.922 | |||||
80.079(1, 0, −45) | 0.532 | 89.711(2, 1, −70) | 0.835 | 73.365(3, 0, −122) | 0.915 | 143.104(3, 2, −60) | 0.920 | |||
81.427(1, 0, −44) | 0.784 | 91.017(2, 1, −69) | 0.834 | 73.966(3, 0, −121) | 0.915 | 145.460(3, 2, −59) | 0.919 | |||
82.262(1, 0, −43) | 0.605 | 92.357(2, 1, −68) | 0.834 | 74.573(3, 0, −120) | 0.915 | 147.905(3, 3, −59) | 0.919 | |||
84.045(1, 1, −43) | 0.513 | 93.700(2, 1, −67) | 0.834 | 75.176(3, 0, −119) | 0.914 | 150.404(3, 3, −58) | 0.919 | |||
86.042(1, 1, −42) | 0.505 | 94.961(2, 1, −66) | 0.834 | 75.741(3, 0, −118) | 0.912 | 152.752(3, 3, −57) | 0.923 | |||
88.135(1, 1, −41) | 0.504 | 96.060(2, 1, −65) | 0.835 | 76.259(3, 0, −117) | 0.913 | 154.085(3, 3, −56) | 0.927 | |||
90.289(1, 1, −40) | 0.504 | 97.268(2, 1, −64) | 0.835 | 76.826(3, 0, −116) | 0.915 | 156.107(3, 3, −55) | 0.921 | |||
92.440(1, 1, −39) | 0.506 | 98.704(2, 1, −63) | 0.835 | 77.463(3, 0, −115) | 0.917 | 158.756(3, 3, −54) | 0.922 | |||
94.501(1, 1, −38) | 0.510 | 100.261(2, 1, −62) | 0.836 | 78.126(3, 0, −114) | 0.917 | 161.419(3, 3, −53) | 0.926 | |||
96.588(1, 1, −37) | 0.512 | 101.882(2, 1, −61) | 0.837 | 78.795(3, 0, −113) | 0.918 | 163.877(3, 3, −52) | 0.933 | |||
98.956(1, 1, −36) | 0.511 | 103.525(2, 1, −60) | 0.841 | 79.467(3, 0, −112) | 0.919 | 166.324(3, 3, −51) | 0.929 | |||
101.614(1, 1, −35) | 0.515 | 105.094(2, 1, −59) | 0.853 | 80.136(3, 0, −111) | 0.921 | 169.171(3, 3, −50) | 0.923 | |||
104.448(1, 1, −34) | 0.542 | 106.458(2, 1, −58) | 0.866 | 80.781(3, 0, −110) | 0.923 | 172.358(3, 3, −49) | 0.920 | |||
106.628(1, 1, −33) | 0.809 | 107.890(2, 1, −57) | 0.853 | 81.405(3, 0, −109) | 0.923 | 175.756(3, 4, −49) | 0.919 | |||
108.119(1, 2, −33) | 0.584 | 109.624(2, 1, −56) | 0.843 | 82.070(3, 0, −108) | 0.921 | 179.227(3, 4, −48) | 0.921 | |||
111.257(1, 2, −32) | 0.510 | 111.535(2, 1, −55) | 0.839 | 82.795(3, 0, −107) | 0.920 | 181.057(3, 4, −47) | 0.942 | |||
114.802(1, 2, −31) | 0.504 | 113.545(2, 2, −55) | 0.838 | 83.560(3, 0, −106) | 0.919 | 183.359(3, 4, −46) | 0.921 | |||
118.595(1, 2, −30) | 0.504 | 115.605(2, 2, −54) | 0.839 | 84.349(3, 0, −105) | 0.919 | 187.183(3, 4, −45) | 0.920 | |||
122.602(1, 2, −29) | 0.506 | 117.600(2, 2, −53) | 0.843 | 85.157(3, 0, −104) | 0.918 | 191.181(3, 4, −44) | 0.922 | |||
126.726(1, 2, −28) | 0.522 | 119.260(2, 2, −52) | 0.846 | 85.981(3, 0, −103) | 0.919 | 195.152(3, 4, −43) | 0.927 | |||
130.331(1, 2, −27) | 0.673 | 120.950(2, 2, −51) | 0.839 | 86.813(3, 0, −102) | 0.919 | 198.767(3, 4, −42) | 0.935 | |||
132.705(1, 2, −26) | 0.713 | 123.113(2, 2, −50) | 0.837 | 87.637(3, 0, −101) | 0.920 | 202.195(3, 5, −42) | 0.931 | |||
136.429(1, 3, −26) | 0.562 | 125.507(2, 2, −49) | 0.837 | 88.426(3, 0, −100) | 0.922 | 206.064(3, 5, −41) | 0.927 | |||
140.721(1, 3, −25) | 0.528 | 127.980(2, 2, −48) | 0.842 | 89.186(3, 1, −100) | 0.922 | 208.194(3, 5, −40) | 0.951 | |||
145.499(1, 3, −24) | 0.515 | 130.328(2, 2, −47) | 0.858 | 89.977(3, 1, −99) | 0.921 | 211.473(3, 5, −39) | 0.925 | |||
151.060(1, 3, −23) | 0.516 | 132.312(2, 2, −46) | 0.871 | 90.837(3, 1, −98) | 0.919 | 216.489(3, 5, −38) | 0.920 | |||
157.146(1, 3, −22) | 0.586 | 134.571(2, 2, −45) | 0.852 | 91.753(3, 1, −97) | 0.918 | 221.926(3, 5, −37) | 0.919 | |||
159.957(1, 3, −21) | 0.872 | 137.350(2, 2, −44) | 0.842 | 92.707(3, 1, −96) | 0.918 | 227.679(3, 6, −37) | 0.919 | |||
164.999(1, 4, −21) | 0.518 | 140.383(2, 3, −44) | 0.840 | 93.688(3, 1, −95) | 0.917 | 233.424(3, 6, −36) | 0.936 | |||
172.796(1, 4, −20) | 0.506 | 143.525(2, 3, −43) | 0.841 | 94.688(3, 1, −94) | 0.917 | 234.266(3, 6, −35) | 0.944 | |||
181.381(1, 4, −19) | 0.537 | 146.442(2, 3, −42) | 0.852 | 95.696(3, 1, −93) | 0.917 | 240.137(3, 6, −34) | 0.920 | |||
184.971(1, 4, −18) | 0.946 | 148.490(2, 3, −41) | 0.857 | 96.678(3, 1, −92) | 0.916 | 246.672(3, 6, −33) | 0.922 | |||
191.532(1, 5, −18) | 0.513 | 151.285(2, 3, −40) | 0.842 | 97.559(3, 1, −91) | 0.914 | 253.285(3, 6, −32) | 0.924 | |||
202.262(1, 5, −17) | 0.511 | 154.841(2, 3, −39) | 0.841 | 98.379(3, 1, −90) | 0.913 | 259.690(3, 7, −32) | 0.930 | |||
209.971(1, 5, −16) | 0.950 | 158.600(2, 3, −38) | 0.847 | 99.335(3, 1, −89) | 0.915 | 261.738(3, 7, −31) | 0.961 | |||
214.936(1, 6, −16) | 0.534 | 162.205(2, 3, −37) | 0.867 | 100.404(3, 1, −88) | 0.916 | 266.698(3, 7, −30) | 0.926 | |||
228.286(1, 6, −15) | 0.519 | 165.256(2, 3, −36) | 0.879 | 101.508(3, 1, −87) | 0.917 | 274.132(3, 7, −29) | 0.923 | |||
236.146(1, 6, −14) | 0.940 | 168.714(2, 4, −36) | 0.853 | 102.583(3, 1, −86) | 0.919 | 282.527(3, 7, −28) | 0.920 | |||
244.380(1, 7, −14) | 0.531 | 172.920(2, 4, −35) | 0.844 | 103.550(3, 1, −85) | 0.923 | 289.899(3, 8, −28) | 0.969 | |||
259.795(1, 7, −13) | 0.673 | 176.887(2, 4, −34) | 0.867 | 104.500(3, 1, −84) | 0.923 | 291.819(3, 8, −27) | 0.920 | |||
264.796(1, 7, −12) | 0.787 | 179.615(2, 4, −33) | 0.876 | 105.609(3, 1, −83) | 0.921 | 301.852(3, 8, −26) | 0.919 | |||
281.150(1, 8, −12) | 0.564 | 183.967(2, 4, −32) | 0.848 | 106.840(3, 1, −82) | 0.919 | 312.725(3, 9, −26) | 0.918 | |||
290.383(1, 8, −11) | 0.861 | 189.361(2, 4, −31) | 0.843 | 108.142(3, 1, −81) | 0.919 | 318.626(3, 9, −25) | 0.974 | |||
305.164(1, 9, −11) | 0.591 | 195.099(2, 5, −31) | 0.846 | 109.493(3, 1, −80) | 0.919 | 324.479(3, 9, −24) | 0.918 | |||
316.966(1, 9, −10) | 0.810 | 199.571(2, 5, −30) | 0.895 | 110.875(3, 1, −79) | 0.919 | 337.177(3, 9, −23) | 0.918 | |||
332.335(1,10, −10) | 0.665 | 202.435(2, 5, −29) | 0.859 | 112.270(3, 1, −78) | 0.920 | |||||
208.527(2, 5, −28) | 0.847 | 113.646(3, 1, −77) | 0.922 | |||||||
73.274(2, 0, −86) | 0.833 | 215.073(2, 5, −27) | 0.855 | 114.966(3, 1, −76) | 0.924 |
Notes. νmod represents model frequency in μHz. np is the number of radial nodes in propagation cavity of p-mode. ng is the number of radial nodes in propagation cavity of g-mode. βk,l is one parameter weight the size of rotational splitting.
Current usage metrics show cumulative count of Article Views (full-text article views including HTML views, PDF and ePub downloads, according to the available data) and Abstracts Views on Vision4Press platform.
Data correspond to usage on the plateform after 2015. The current usage metrics is available 48-96 hours after online publication and is updated daily on week days.
Initial download of the metrics may take a while.