Table of the dimensions of the spaces of Bianchi cusp forms for $$\Gamma_0(\mathfrak{n})\subseteq \SL(2,\mathcal{O}_K)$$ for levels $$\mathfrak{n}$$ ordered by norm, over $$K=$$ $$\Q(\sqrt{-67})$$.

For each weight $w$, we show both the dimension $d$ of the space of cusp forms of weight $w$, and the dimension $n$ of the new subspace.

Displaying items 1-50 of 135 levels, showing only levels with positive cuspidal dimension.

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weight 2 3 4 5 6 7 8 9 10 11
level label norm $d$ $n$ $d$ $n$ $d$ $n$ $d$ $n$ $d$ $n$ $d$ $n$ $d$ $n$ $d$ $n$ $d$ $n$ $d$ $n$
1.1 1 2 2 5 5 8 8 10 10 13 13 16 16 19 19 22 22 24 24 27 27
4.1 4 7 3 15 5 24 8 32 12 40 14
9.1 9 10 6 21 11 32 16 43 23
16.1 16 14 2 30 5 47 7
17.1 17 7 3 10 0 16 0
17.2 17 7 3 10 0 16 0
19.1 19 4 0 10 0 16 0
19.2 19 4 0 10 0 16 0
23.1 23 4 0 10 0 16 0
23.2 23 4 0 10 0 16 0
25.1 25 15 11 32 22 50 34
29.1 29 4 0 10 0
29.2 29 4 0 10 0
36.1 36 31 5 66 14
37.1 37 4 0 10 0
37.2 37 4 0 10 0
47.1 47 4 0 10 0
47.2 47 4 0 10 0
49.1 49 21 17 44 34
59.1 59 4 0 10 0
59.2 59 4 0 10 0
64.1 64 29 8
67.1 67 9 5 10 0
68.1 68 20 0
68.2 68 20 0
71.1 71 4 0 10 0
71.2 71 4 0 10 0
73.1 73 4 0
73.2 73 4 0
76.1 76 14 0
76.2 76 14 0
81.1 81 50 32
83.1 83 4 0
83.2 83 4 0
89.1 89 5 1
89.2 89 5 1
92.1 92 14 0
92.2 92 14 0
100.1 100 47 11
103.1 103 4 0
103.2 103 4 0
107.1 107 4 0
107.2 107 4 0
116.1 116 14 0
116.2 116 14 0
121.1 121 37 33
127.1 127 4 0
127.2 127 4 0
131.1 131 4 0
131.2 131 4 0

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