Figure 7- Structures en multiplet
| Fréquence en \(jour^{-1} \) |
Amplitude |
Phase |
| 2.80895948053748 |
0.200738943767603 |
0.980789453345853 |
\(f_0\) |
| 2.84626636594371 |
0.0737817819310651 |
0.345680448967835 |
\( f_0 + f_b\) |
| 2.8832317 |
0.00391607905056187 |
0.124399700610112 |
\( f_0 + 2 f_b\) |
| 2.92264082278848 |
0.000771715465729327 |
0.84665473280754 |
\( f_0 + 3 f_b\) |
| 2.77165669030484 |
0.0300240842652289 |
0.280835646996768 |
\( f_0 - f_b\) |
| 2.7346741167343 |
0.00442521808843918 |
0.425691624060245 |
\( f_0 - 2 f_b\) |
| 2.69844499 |
0.001125673335522 |
0.806303469899178 |
\( f_0 - 3 f_b\) |
| 5.61791923345215 |
0.0817201212933029 |
0.338542767040143 |
\( 2 f_0\) |
| 5.65522857545418 |
0.0497598786558529 |
0.640866000254933 |
\( 2 f_0 + f_b\) |
| 5.69286707 |
0.00364234553048444 |
0.014752543795776 |
\( 2 f_0 + 2 f_b\) |
| 5.72985017 |
0.00318174134970446 |
0.988332764932675 |
\( 2 f_0 + 3 f_b\) |
| 5.58095895999655 |
0.0254468584970378 |
0.704649196948409 |
\( 2 f_0 - f_b\) |
| 5.54365328 |
0.00308491672082691 |
0.900286821344707 |
\( 2 f_0 - 2 f_b\) |
| 5.50634822646029 |
0.000720754828054444 |
0.891772100594199 |
\( 2 f_0 - 3 f_b\) |
| 8.42723467925596 |
0.035432341066867 |
0.711429582500274 |
\( 3 f_0\) |
| 8.46453330905443 |
0.043431541185428 |
0.0468080644291833 |
\( 3 f_0 + f_b\) |
| 8.50149820850371 |
0.0136088843316336 |
0.30637959156072 |
\( 3 f_0 + 2 f_b\) |
| 8.53879506 |
0.0023393389057625 |
0.281157061415432 |
\( 3 f_0 + 3 f_b\) |
| 8.57612353 |
0.0011913288290935 |
0.735564918575606 |
\( 3 f_0 + 4 f_b\) |
| 8.38992973758088 |
0.0155376374671033 |
0.0539176573074645 |
\( 3 f_0 - f_b\) |
| 8.35296448 |
0.00333373178789748 |
0.289753185750534 |
\( 3 f_0 - 2 f_b\) |
| 8.31565084 |
0.00123952048154556 |
0.499640726185717 |
\( 3 f_0 - 3 f_b\) |
| 11.2365287350956 |
0.0133507380014899 |
0.173715358165829 |
\( 4 f_0\) |
| 11.273495795363 |
0.0238875199205899 |
0.402853857928394 |
\( 4 f_0 + f_b \) |
| 11.3104707984677 |
0.0135445935858635 |
0.658308977866987 |
\( 4 f_0 + 2 f_b \) |
| 11.3477688 |
0.00287146994475508 |
0.977861315557783 |
\( 4 f_0 + 3 f_b \) |
| 11.3857695829887 |
0.000886171706662979 |
0.130007925940231 |
\( 4 f_0 + 4 f_b \) |
| 11.1992221978912 |
0.00945427915136061 |
0.534568680871065 |
\( 4 f_0 - f_b \) |
| 11.161907 |
0.0022255027193788 |
0.780523785334869 |
\( 4 f_0 - 2 f_b \) |
| 11.1246184 |
0.00109073339503715 |
0.828932603897002 |
\( 4 f_0 - 3 f_b \) |
| 11.0859032557958 |
0.000539535562836175 |
0.802912108035041 |
\( 4 f_0 - 4 f_b \) |
| 14.0455006575577 |
0.00548169854814799 |
0.475308069208514 |
\( 5 f_0\) |
| 14.0824663605381 |
0.0139227639174589 |
0.720974229200477 |
\( 5 f_0 + f_b \) |
| 14.1197644567452 |
0.0108982111049084 |
0.0956320465793809 |
\( 5 f_0 + 2 f_b \) |
| 14.1570638 |
0.00383139185900076 |
0.519001279121183 |
\( 5 f_0 + 3 f_b \) |
| 14.1943767320486 |
0.000766103205592753 |
0.65021516290172 |
\( 5 f_0 + 4 f_b \) |
| 14.0081831934649 |
0.00578915117702656 |
0.899297032637309 |
\( 5 f_0 - f_b \) |
| 13.9740521 |
0.0018035028060422 |
0.435874795891202 |
\( 5 f_0 - 2 f_b \) |
| 13.934281408345 |
0.000947869000160287 |
0.341157265672117 |
\( 5 f_0 - 3 f_b \) |
| 16.8544603 |
0.00147052711323088 |
0.711144947718588 |
\( 6 f_0\) |
| 16.8914419171149 |
0.0094524774844663 |
0.0361458218509189 |
\( 6 f_0 + f_b \) |
| 16.9287331754416 |
0.00882084860762439 |
0.418527292485493 |
\( 6 f_0 + 2 f_b \) |
| 16.9657015 |
0.0039666575092558 |
0.730216168991491 |
\( 6 f_0 + 3 f_b \) |
| 17.0029838811136 |
0.000935299216938527 |
0.176868133208677 |
\( 6 f_0 + 4 f_b \) |
| 16.8171571 |
0.00311766068213557 |
0.248691437655249 |
\( 6 f_0 - f_b \) |
| 16.780183 |
0.00128562516168195 |
0.604428792971362 |
\( 6 f_0 - 2 f_b \) |
| 16.7435924689748 |
0.000573484691357257 |
0.695209370022111 |
\( 6 f_0 - 3 f_b \) |
| 19.6630791 |
0.00174695739525738 |
0.832493237758833 |
\( 7 f_0\) |
| 19.7010622866475 |
0.00520380257789987 |
0.565542980679668 |
\( 7 f_0 + f_b\) |
| 19.738017271714 |
0.00781074605117326 |
0.893895320666249 |
\( 7 f_0 + 2 f_b\) |
| 19.774977561457 |
0.00413053650709095 |
0.211426506143541 |
\( 7 f_0 + 3 f_b\) |
| 19.811591 |
0.00108063583652671 |
0.504859912315649 |
\( 7 f_0 + 4 f_b\) |
| 19.6267883 |
0.00169679864093919 |
0.798695159414803 |
\( 7 f_0 - f_b\) |
| 19.5895069310567 |
0.000894261535773442 |
0.046124255161324 |
\( 7 f_0 - 2 f_b\) |
| 22.4723691 |
0.00211412855911982 |
0.297402388329245 |
\( 8 f_0\) |
| 22.5100258 |
0.00290174345961384 |
0.880718201497443 |
\( 8 f_0 + f_b\) |
| 22.5469957066343 |
0.0056402829671587 |
0.210301450315303 |
\( 8 f_0 + 2 f_b\) |
| 22.5839599462664 |
0.0041916501004347 |
0.505568664853118 |
\( 8 f_0 + 3 f_b\) |
| 22.6212396 |
0.00132055168607418 |
0.935071086253611 |
\( 8 f_0 + 4 f_b\) |
| 22.4354213931386 |
0.000666545637323175 |
0.0939839327576133 |
\( 8 f_0 - f_b\) |
| 22.398817991697 |
0.000621937003573732 |
0.51756567253753 |
\( 8 f_0 - 2f_b\) |
| 25.2815505 |
0.00164838506480252 |
0.0549091864648971 |
\( 9 f_0\) |
| 25.3188688 |
0.00181004028473549 |
0.507862126692103 |
\( 9 f_0 + f_b\) |
| 25.3561755 |
0.00379033888322068 |
0.960999034723015 |
\( 9 f_0 + 2 f_b\) |
| 25.3931371 |
0.00366737402253517 |
0.267850589197603 |
\( 9 f_0 + 3 f_b\) |
| 25.4304452 |
0.00159212833696628 |
0.616977322747804 |
\( 9 f_0 + 4 f_b\) |
| 28.0908757 |
0.00112258535440615 |
0.405422514380507 |
\( 10 f_0\) |
| 28.1278161 |
0.00144707304641316 |
0.844306640560479 |
\( 10 f_0 + f_b\) |
| 28.1651408 |
0.00239310859199382 |
0.285260806890781 |
\( 10 f_0 + 2 f_b\) |
| 28.202095 |
0.00295134290998671 |
0.637940529515873 |
\( 10 f_0 + 3 f_b\) |
| 28.2394004 |
0.0018080281581802 |
0.991252304451771 |
\( 10 f_0 + 4 f_b\) |
| 28.1278161 |
0.00144707304641316 |
0.844306640560479 |
\( 10 f_0 - f_b\) |
| 30.8999579765011 |
0.000719478521732142 |
0.403237538321789 |
\( 11 f_0\) |
| 30.9371243 |
0.00121489315243057 |
0.223802972101219 |
\( 11 f_0 + f_b\) |
| 30.9744441 |
0.00171902626462632 |
0.671772635342422 |
\( 11 f_0 + 2 f_b\) |
| 31.0110567 |
0.00234853483858457 |
0.00409358429173227 |
\( 11 f_0 + 3 f_b\) |
| 31.0483764 |
0.00171934357323519 |
0.3101781801029 |
\( 11 f_0 + 4 f_b\) |
| 31.0861425857567 |
0.000612634435655276 |
0.394164259773427 |
\( 11 f_0 + 5 f_b\) |
| 33.7461012 |
0.000991397822322469 |
0.525175701367129 |
\( 12 f_0 + f_b\) |
| 33.7834069 |
0.00121471438506202 |
0.986469692055 |
\( 12 f_0 + 2 f_b\) |
| 33.8206865 |
0.00156835864611261 |
0.497440592893748 |
\( 12 f_0 + 3 f_b\) |
| 33.8576516 |
0.00163787476536962 |
0.832601907358182 |
\( 12 f_0 + 4 f_b\) |
| 33.8942745944987 |
0.000767548955195848 |
0.0480729707072451 |
\( 12 f_0 + 5 f_b\) |
| 36.5550603146473 |
0.000713234018095201 |
0.867896583935994 |
\( 13 f_0 + f_b\) |
| 36.5923676 |
0.000917884259095767 |
0.312264410448627 |
\( 13 f_0 + 2 f_b\) |
| 36.6296802 |
0.0012363954869558 |
0.737655153215325 |
\( 13 f_0 + 3 f_b\) |
| 36.6669382 |
0.00123566230646946 |
0.272716750354766 |
\( 13 f_0 + 4 f_b\) |
| 36.7042895666768 |
0.000768106239480465 |
0.508358239305807 |
\( 13 f_0 + 5 f_b\) |
| 39.3641426040061 |
0.000543280824709609 |
0.884398724015829 |
\( 14 f_0 + f_b\) |
| 39.4009747767005 |
0.000745575405282621 |
0.617929952787275 |
\( 14 f_0 + 2 f_b\) |
| 39.4386340454909 |
0.000860930544017627 |
0.0969214145600229 |
\( 14 f_0 + 3 f_b\) |
| 39.4755894 |
0.000949616102656079 |
0.465411257269822 |
\( 14 f_0 + 4 f_b\) |
| 39.5128967157226 |
0.000716594505499209 |
0.841374996290826 |
\( 14 f_0 + 5 f_b\) |