## Results (1-50 of at least 1000)

Label $$A$$ $$\chi$$ $$\operatorname{ord}(\chi)$$ Dim. Decomp. AL-dims.
23.1.b $$0.011478495290559056$$ $$\chi_{ 23 }(22, \cdot)$$ $$2$$ $$1$$ $$1$$
31.1.b $$0.015471015391623074$$ $$\chi_{ 31 }(30, \cdot)$$ $$2$$ $$1$$ $$1$$
39.1.d $$0.019463535492687093$$ $$\chi_{ 39 }(38, \cdot)$$ $$2$$ $$1$$ $$1$$
44.1.d $$0.021958860555852104$$ $$\chi_{ 44 }(21, \cdot)$$ $$2$$ $$1$$ $$1$$
47.1.b $$0.023456055593751114$$ $$\chi_{ 47 }(46, \cdot)$$ $$2$$ $$2$$ $$2$$
52.1.j $$0.025951380656916125$$ $$\chi_{ 52 }(3, \cdot)$$ $$6$$ $$2$$ $$2$$
55.1.d $$0.027448575694815132$$ $$\chi_{ 55 }(54, \cdot)$$ $$2$$ $$1$$ $$1$$
56.1.h $$0.027947640707448134$$ $$\chi_{ 56 }(13, \cdot)$$ $$2$$ $$1$$ $$1$$
57.1.h $$0.028446705720081136$$ $$\chi_{ 57 }(11, \cdot)$$ $$6$$ $$2$$ $$2$$
59.1.b $$0.02944483574534714$$ $$\chi_{ 59 }(58, \cdot)$$ $$2$$ $$1$$ $$1$$
63.1.d $$0.03144109579587915$$ $$\chi_{ 63 }(55, \cdot)$$ $$2$$ $$1$$ $$1$$
68.1.d $$0.033936420859044164$$ $$\chi_{ 68 }(67, \cdot)$$ $$2$$ $$1$$ $$1$$
68.1.f $$0.033936420859044164$$ $$\chi_{ 68 }(47, \cdot)$$ $$4$$ $$2$$ $$2$$
71.1.b $$0.03543361589694317$$ $$\chi_{ 71 }(70, \cdot)$$ $$2$$ $$3$$ $$3$$
72.1.p $$0.03593268090957617$$ $$\chi_{ 72 }(43, \cdot)$$ $$6$$ $$2$$ $$2$$
76.1.c $$0.03792894096010818$$ $$\chi_{ 76 }(37, \cdot)$$ $$2$$ $$1$$ $$1$$
77.1.j $$0.03842800597274119$$ $$\chi_{ 77 }(20, \cdot)$$ $$10$$ $$4$$ $$4$$
79.1.b $$0.03942613599800719$$ $$\chi_{ 79 }(78, \cdot)$$ $$2$$ $$2$$ $$2$$
80.1.h $$0.03992520101064019$$ $$\chi_{ 80 }(79, \cdot)$$ $$2$$ $$1$$ $$1$$
83.1.b $$0.0414223960485392$$ $$\chi_{ 83 }(82, \cdot)$$ $$2$$ $$1$$ $$1$$
84.1.p $$0.0419214610611722$$ $$\chi_{ 84 }(53, \cdot)$$ $$6$$ $$2$$ $$2$$
87.1.d $$0.04341865609907121$$ $$\chi_{ 87 }(86, \cdot)$$ $$2$$ $$2$$ $$1$$+$$1$$
88.1.l $$0.04391772111170421$$ $$\chi_{ 88 }(3, \cdot)$$ $$10$$ $$4$$ $$4$$
93.1.l $$0.04641304617486922$$ $$\chi_{ 93 }(2, \cdot)$$ $$10$$ $$4$$ $$4$$
95.1.d $$0.04741117620013523$$ $$\chi_{ 95 }(94, \cdot)$$ $$2$$ $$3$$ $$1$$+$$2$$
99.1.h $$0.049407436250667236$$ $$\chi_{ 99 }(43, \cdot)$$ $$6$$ $$2$$ $$2$$
100.1.j $$0.04990650126330024$$ $$\chi_{ 100 }(11, \cdot)$$ $$10$$ $$4$$ $$4$$
11.2.a $$0.08783544222340842$$ $$\chi_{ 11 }(1, \cdot)$$ $$1$$ $$1$$ $$1$$ $$0$$+$$1$$
13.2.e $$0.1038055226276645$$ $$\chi_{ 13 }(4, \cdot)$$ $$6$$ $$2$$ $$2$$
14.2.a $$0.11179056282979254$$ $$\chi_{ 14 }(1, \cdot)$$ $$1$$ $$1$$ $$1$$ $$0$$+$$1$$+$$0$$+$$0$$
15.2.a $$0.11977560303192057$$ $$\chi_{ 15 }(1, \cdot)$$ $$1$$ $$1$$ $$1$$ $$0$$+$$1$$+$$0$$+$$0$$
16.2.e $$0.12776064323404862$$ $$\chi_{ 16 }(5, \cdot)$$ $$4$$ $$2$$ $$2$$
17.2.a $$0.13574568343617666$$ $$\chi_{ 17 }(1, \cdot)$$ $$1$$ $$1$$ $$1$$ $$0$$+$$1$$
17.2.d $$0.13574568343617666$$ $$\chi_{ 17 }(2, \cdot)$$ $$8$$ $$4$$ $$4$$
18.2.c $$0.1437307236383047$$ $$\chi_{ 18 }(7, \cdot)$$ $$3$$ $$2$$ $$2$$
19.2.a $$0.15171576384043273$$ $$\chi_{ 19 }(1, \cdot)$$ $$1$$ $$1$$ $$1$$ $$0$$+$$1$$
19.2.e $$0.15171576384043273$$ $$\chi_{ 19 }(4, \cdot)$$ $$9$$ $$6$$ $$6$$
20.2.a $$0.15970080404256076$$ $$\chi_{ 20 }(1, \cdot)$$ $$1$$ $$1$$ $$1$$ $$0$$+$$0$$+$$1$$+$$0$$
20.2.e $$0.15970080404256076$$ $$\chi_{ 20 }(3, \cdot)$$ $$4$$ $$2$$ $$2$$
21.2.a $$0.1676858442446888$$ $$\chi_{ 21 }(1, \cdot)$$ $$1$$ $$1$$ $$1$$ $$0$$+$$0$$+$$1$$+$$0$$
21.2.e $$0.1676858442446888$$ $$\chi_{ 21 }(4, \cdot)$$ $$3$$ $$2$$ $$2$$
21.2.g $$0.1676858442446888$$ $$\chi_{ 21 }(5, \cdot)$$ $$6$$ $$2$$ $$2$$
22.2.c $$0.17567088444681683$$ $$\chi_{ 22 }(3, \cdot)$$ $$5$$ $$4$$ $$4$$
23.2.a $$0.1836559246489449$$ $$\chi_{ 23 }(1, \cdot)$$ $$1$$ $$2$$ $$2$$ $$0$$+$$2$$
23.2.c $$0.1836559246489449$$ $$\chi_{ 23 }(2, \cdot)$$ $$11$$ $$10$$ $$10$$
24.2.a $$0.19164096485107293$$ $$\chi_{ 24 }(1, \cdot)$$ $$1$$ $$1$$ $$1$$ $$0$$+$$0$$+$$1$$+$$0$$
24.2.d $$0.19164096485107293$$ $$\chi_{ 24 }(13, \cdot)$$ $$2$$ $$2$$ $$2$$
24.2.f $$0.19164096485107293$$ $$\chi_{ 24 }(11, \cdot)$$ $$2$$ $$2$$ $$2$$
25.2.d $$0.19962600505320097$$ $$\chi_{ 25 }(6, \cdot)$$ $$5$$ $$4$$ $$4$$
25.2.e $$0.19962600505320097$$ $$\chi_{ 25 }(4, \cdot)$$ $$10$$ $$8$$ $$8$$