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Galois conjugate representations are grouped into single lines.
Label Dimension Conductor Artin stem field $G$ Ind $\chi(c)$
$2$ $ 983 $ 27.1.800194812883861824535483445924579987063.1 $D_{27}$ $1$ $0$
$2$ $ 1231 $ 27.1.14905779350658261917360296447434047234191.1 $D_{27}$ $1$ $0$
$2$ $ 1399 $ 27.1.78637606867438430727852801672920631138199.1 $D_{27}$ $1$ $0$
$2$ $ 1607 $ 27.1.476657463863730234951616960570180249031207.1 $D_{27}$ $1$ $0$
$2$ $ 2^{2} \cdot 419 $ 27.1.3216045767164746225347277064349747511296.1 $D_{27}$ $1$ $0$
$2$ $ 1759 $ 27.1.1543319746516623033280478216838436483146079.1 $D_{27}$ $1$ $0$
$2$ $ 1879 $ 27.1.3639553781467035763182087002112051895733239.1 $D_{27}$ $1$ $0$
$2$ $ 2^{2} \cdot 491 $ 27.1.25269655401421846003597046184882515738624.1 $D_{27}$ $1$ $0$
$2$ $ 1999 $ 27.1.8138911451501750747538217172562287688025999.1 $D_{27}$ $1$ $0$
$2$ $ 2^{2} \cdot 563 $ 27.1.149674927005884133619412112407487159468032.1 $D_{27}$ $1$ $0$
$2$ $ 31 \cdot 89 $ 27.1.536750065653068684465204465961269314591399079.1 $D_{27}$ $1$ $0$
$2$ $ 13 \cdot 227 $ 27.1.1287062756823986424273208421285283554009333351.1 $D_{27}$ $1$ $0$
$2$ $ 3271 $ 27.1.4907350451606845763597379498834801987276076711.1 $D_{27}$ $1$ $0$
$2$ $ 7 \cdot 521 $ 27.1.20191329826970487018697554420683199956085496127.1 $D_{27}$ $1$ $0$
$2$ $ 3671 $ 27.1.21988570612019400506053514781537922706637489911.1 $D_{27}$ $1$ $0$
$2$ $ 3943 $ 27.1.55686266560375612156826962909758952173810975943.1 $D_{27}$ $1$ $0$
$2$ $ 7^{2} \cdot 199 $ 27.1.1249840845592629138161700045087827071680376951.1 $D_{27}$ $1$ $0$
$2$ $ 19^{2} \cdot 31 $ 27.1.119615770666944050013402329147269064161944026933311.1 $D_{27}$ $1$ $0$
$2$ $ 5 \cdot 7^{2} \cdot 67 $ 27.1.1089801024238603052304820653163822019730224609375.1 $D_{27}$ $1$ $0$
$2$ $ 3^{6} \cdot 23 $ 27.1.15576313507383139645975038414456506401400202794607.1 $D_{27}$ $1$ $0$
$2$ $ 7^{2} \cdot 367 $ 27.1.3567989400462155147048339898163452848532229105663.1 $D_{27}$ $1$ $0$
$2$ $ 7^{2} \cdot 419 $ 27.1.19977770457280786686246139734781554667936251692291.1 $D_{27}$ $1$ $0$
$2$ $ 19^{2} \cdot 59 $ 27.1.514236115200650829771616557620114284006102438093779659.1 $D_{27}$ $1$ $0$
$2$ $ 3^{4} \cdot 5 \cdot 67 $ 27.1.100449472719512733423421001345835601036409912109375.1 $D_{27}$ $1$ $0$
$2$ $ 7^{2} \cdot 563 $ 27.1.929766412363569678535445062868135961189021577764947.1 $D_{27}$ $1$ $0$
$2$ $ 13^{2} \cdot 199 $ 27.1.86311832016540901180083101912199499488333854262271.1 $D_{27}$ $1$ $0$
$2$ $ 19^{2} \cdot 107 $ 27.1.1180525935628270598995267701687114465729119659275282521147.1 $D_{27}$ $1$ $0$
$2$ $ 2^{2} \cdot 19^{2} \cdot 29 $ 27.1.3373185950645719004485890066954496446810602365539231727616.1 $D_{27}$ $1$ $0$
$2$ $ 3^{6} \cdot 59 $ 27.1.3243985937089221024696954498585954055311554985836709891.1 $D_{27}$ $1$ $0$
$2$ $ 2^{2} \cdot 109^{2}$ 27.1.6307668105570297141830819794889700787485145990104714601037824.1 $D_{27}$ $1$ $0$
$2$ $ 2^{3} \cdot 3^{8}$ 27.1.388658145911668700725909304523422641229510998258637340672.1 $D_{27}$ $1$ $0$
$2$ $ 3^{6} \cdot 83 $ 27.1.274168788122017068364885285850316109447378605557980428027.1 $D_{27}$ $1$ $0$
$2$ $ 3^{8} \cdot 11 $ 27.1.24406350882968529902040510246230531641788690228204697477539.1 $D_{27}$ $1$ $0$
$2$ $ 2^{3} \cdot 3^{6} \cdot 13 $ 27.1.5145602365484447271133818309954768271782486625022436704256.1 $D_{27}$ $1$ $0$
$2$ $ 3 \cdot 163^{2}$ 27.1.5241481120810791287041352021351164391031399505857448708223826507.1 $D_{27}$ $1$ $0$
$2$ $ 7 \cdot 109^{2}$ 27.1.9106751095123626208974848004287627712127035933631211698051073887.1 $D_{27}$ $1$ $0$
$2$ $ 2^{2} \cdot 3^{6} \cdot 29 $ 27.1.21279267370810673170884938555249596353022453789542353731584.1 $D_{27}$ $1$ $0$
$2$ $ 37^{2} \cdot 83 $ 27.1.384464795341703062334336923424599744339833960371380325375195843.1 $D_{27}$ $1$ $0$
$2$ $ 23 \cdot 73^{2}$ 27.1.264368989554793396319566828750216040661269171526894440678054903.1 $D_{27}$ $1$ $0$
$2$ $ 2^{2} \cdot 3^{8} \cdot 5 $ 27.1.57914576815317377556250885803017413799391835668480000000000000.1 $D_{27}$ $1$ $0$
$2$ $ 2^{3} \cdot 13 \cdot 37^{2}$ 27.1.7215638854833213480810622761279953521829588290924096145120559104.1 $D_{27}$ $1$ $0$
$2$ $ 2^{2} \cdot 3 \cdot 109^{2}$ 27.1.39283048191707628320527883233780986049240939103053589440900104192.1 $D_{27}$ $1$ $0$
$2$ $ 37^{2} \cdot 107 $ 27.1.10443125268127426108314551003120573076592426438160398083635986427.1 $D_{27}$ $1$ $0$
$2$ $ 3 \cdot 5 \cdot 109^{2}$ 27.1.182925947903225330265834383823820324843940041507843832675833740234375.1 $D_{27}$ $1$ $0$
$2$ $ 7 \cdot 163^{2}$ 27.1.318531388471677810135119721810475953043523228471769525591468625192063.1 $D_{27}$ $1$ $0$
$2$ $ 2^{3} \cdot 163^{2}$ 27.1.1807371981430314320536502018731350757185307445923029861512882885230592.1 $D_{27}$ $1$ $0$
$2$ $ 3^{8} \cdot 5 \cdot 7 $ 27.1.83614677723888848886721436716191809737853720431837328104248046875.1 $D_{27}$ $1$ $0$
$2$ $ 2^{2} \cdot 5 \cdot 109^{2}$ 27.1.7699790167932491628211449944933716781598078601202044190720000000000000.1 $D_{27}$ $1$ $0$
$2$ $ 2^{2} \cdot 3^{8} \cdot 11 $ 27.1.6397978445864902302640507517987856486705054411182492215551983616.1 $D_{27}$ $1$ $0$
$2$ $ 2^{2} \cdot 3^{8} \cdot 11 $ 27.1.6397978445864902302640507517987856486705054411182492215551983616.2 $D_{27}$ $1$ $0$
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