# |
Algebra (L) |
Fundamental group (H) |
Generators of H (k) |
1 |
\( 6 A_3 \) |
\(Z_4^2\) |
|
2 |
\( 2 A_2+2 A_3+2 A_4 \) |
\(1\) |
|
3 |
\( 2 A_1+4 A_4 \) |
\(Z_5\) |
|
4 |
\( A_1+A_2+2 A_3+A_4+A_5 \) |
\(Z_2\) |
|
5 |
\( 4 A_2+2 A_5 \) |
\(Z_3^2\) |
|
6 |
\( A_1+2 A_2+A_3+2 A_5 \) |
\(Z_6\) |
|
7 |
\( 2 A_1+2 A_3+2 A_5 \) |
\(Z_2^2\) |
|
8 |
\( 2 A_2+A_4+2 A_5 \) |
\(Z_3\) |
|
9 |
\( A_1+A_3+A_4+2 A_5 \) |
\(Z_2\) |
|
10 |
\( 2 A_4+2 A_5 \) |
\(1\) |
|
11 |
\( 3 A_1+3 A_5 \) |
\(Z_2 Z_6\) |
|
12 |
\( A_3+3 A_5 \) |
\(Z_6\) |
|
13 |
\( 3 A_6 \) |
\(Z_7\) |
|
14 |
\( A_1+2 A_2+A_3+A_4+A_6 \) |
\(1\) |
|
15 |
\( A_2+2 A_3+A_4+A_6 \) |
\(1\) |
|
16 |
\( 2 A_1+A_2+2 A_4+A_6 \) |
\(1\) |
|
17 |
\( A_1+A_3+2 A_4+A_6 \) |
\(1\) |
|
18 |
\( A_1+2 A_3+A_5+A_6 \) |
\(Z_2\) |
|
19 |
\( A_1+A_2+A_4+A_5+A_6 \) |
\(1\) |
|
20 |
\( A_3+A_4+A_5+A_6 \) |
\(1\) |
|
21 |
\( 2 A_1+2 A_5+A_6 \) |
\(Z_2\) |
|
22 |
\( 2 A_1+2 A_2+2 A_6 \) |
\(1\) |
|
23 |
\( 2 A_3+2 A_6 \) |
\(1\) |
|
24 |
\( A_2+A_4+2 A_6 \) |
\(1\) |
|
25 |
\( 2 A_1+3 A_3+A_7 \) |
\(Z_2 Z_4\) |
|
26 |
\( A_2+3 A_3+A_7 \) |
\(Z_4\) |
|
27 |
\( 2 A_1+A_2+A_3+A_4+A_7 \) |
\(Z_2\) |
|
28 |
\( 2 A_2+A_3+A_4+A_7 \) |
\(1\) |
|
29 |
\( 3 A_1+A_3+A_5+A_7 \) |
\(Z_2^2\) |
|
30 |
\( A_1+A_2+A_3+A_5+A_7 \) |
\(Z_2\) |
|
31 |
\( 2 A_1+A_4+A_5+A_7 \) |
\(Z_2\) |
|
32 |
\( A_2+A_4+A_5+A_7 \) |
\(1\) |
|
33 |
\( A_1+2 A_5+A_7 \) |
\(Z_2\) |
|
34 |
\( A_1+2 A_2+A_6+A_7 \) |
\(1\) |
|
35 |
\( 2 A_1+A_3+A_6+A_7 \) |
\(Z_2\) |
|
36 |
\( A_2+A_3+A_6+A_7 \) |
\(1\) |
|
37 |
\( A_1+A_4+A_6+A_7 \) |
\(1\) |
|
38 |
\( A_5+A_6+A_7 \) |
\(1\) |
|
39 |
\( 4 A_1+2 A_7 \) |
\(Z_2 Z_4\) |
|
40 |
\( 2 A_2+2 A_7 \) |
\(1\) |
|
41 |
\( 2 A_2+2 A_7 \) |
\(Z_2\) |
|
42 |
\( A_1+A_3+2 A_7 \) |
\(Z_8\) |
|
43 |
\( A_1+3 A_2+A_3+A_8 \) |
\(Z_3\) |
|
44 |
\( 3 A_2+A_4+A_8 \) |
\(Z_3\) |
|
45 |
\( A_1+A_2+A_3+A_4+A_8 \) |
\(1\) |
|
46 |
\( 2 A_1+2 A_4+A_8 \) |
\(1\) |
|
47 |
\( A_1+2 A_2+A_5+A_8 \) |
\(Z_3\) |
|
48 |
\( A_2+A_3+A_5+A_8 \) |
\(Z_3\) |
|
49 |
\( A_1+A_4+A_5+A_8 \) |
\(1\) |
|
50 |
\( 2 A_1+A_2+A_6+A_8 \) |
\(1\) |
|
51 |
\( A_1+A_3+A_6+A_8 \) |
\(1\) |
|
52 |
\( A_4+A_6+A_8 \) |
\(1\) |
|
53 |
\( A_1+A_2+A_7+A_8 \) |
\(1\) |
|
54 |
\( 2 A_1+2 A_8 \) |
\(1\) |
|
55 |
\( 2 A_1+2 A_8 \) |
\(Z_3\) |
|
56 |
\( 2 A_9 \) |
\(1\) |
|
57 |
\( 2 A_9 \) |
\(Z_5\) |
|
58 |
\( 2 A_1+2 A_2+A_3+A_9 \) |
\(Z_2\) |
|
59 |
\( A_1+A_2+2 A_3+A_9 \) |
\(Z_2\) |
|
60 |
\( 3 A_1+A_2+A_4+A_9 \) |
\(Z_2\) |
|
61 |
\( 2 A_1+A_3+A_4+A_9 \) |
\(Z_2\) |
|
62 |
\( A_1+2 A_4+A_9 \) |
\(Z_5\) |
|
63 |
\( 2 A_1+A_2+A_5+A_9 \) |
\(Z_2\) |
|
64 |
\( A_1+A_3+A_5+A_9 \) |
\(Z_2\) |
|
65 |
\( A_1+A_3+A_5+A_9 \) |
\(Z_2\) |
|
66 |
\( A_4+A_5+A_9 \) |
\(1\) |
|
67 |
\( A_4+A_5+A_9 \) |
\(Z_2\) |
|
68 |
\( 3 A_1+A_6+A_9 \) |
\(Z_2\) |
|
69 |
\( A_1+A_2+A_6+A_9 \) |
\(1\) |
|
70 |
\( A_3+A_6+A_9 \) |
\(1\) |
|
71 |
\( A_2+A_7+A_9 \) |
\(1\) |
|
72 |
\( A_1+A_8+A_9 \) |
\(1\) |
|
73 |
\( A_1+2 A_2+A_3+A_{10} \) |
\(1\) |
|
74 |
\( A_2+2 A_3+A_{10} \) |
\(1\) |
|
75 |
\( 2 A_1+A_2+A_4+A_{10} \) |
\(1\) |
|
76 |
\( 2 A_2+A_4+A_{10} \) |
\(1\) |
|
77 |
\( A_1+A_3+A_4+A_{10} \) |
\(1\) |
|
78 |
\( 2 A_4+A_{10} \) |
\(1\) |
|
79 |
\( A_1+A_2+A_5+A_{10} \) |
\(1\) |
|
80 |
\( A_3+A_5+A_{10} \) |
\(1\) |
|
81 |
\( 2 A_1+A_6+A_{10} \) |
\(1\) |
|
82 |
\( A_2+A_6+A_{10} \) |
\(1\) |
|
83 |
\( A_1+A_7+A_{10} \) |
\(1\) |
|
84 |
\( A_8+A_{10} \) |
\(1\) |
|
85 |
\( 3 A_1+2 A_2+A_{11} \) |
\(Z_6\) |
|
86 |
\( A_1+3 A_2+A_{11} \) |
\(Z_3\) |
|
87 |
\( 2 A_1+A_2+A_3+A_{11} \) |
\(Z_2\) |
|
88 |
\( 2 A_1+A_2+A_3+A_{11} \) |
\(Z_4\) |
|
89 |
\( 2 A_2+A_3+A_{11} \) |
\(Z_3\) |
|
90 |
\( 2 A_2+A_3+A_{11} \) |
\(Z_6\) |
|
91 |
\( A_1+2 A_3+A_{11} \) |
\(Z_4\) |
|
92 |
\( 3 A_1+A_4+A_{11} \) |
\(Z_2\) |
|
93 |
\( A_1+A_2+A_4+A_{11} \) |
\(1\) |
|
94 |
\( 2 A_1+A_5+A_{11} \) |
\(Z_2\) |
|
95 |
\( 2 A_1+A_5+A_{11} \) |
\(Z_6\) |
|
96 |
\( A_2+A_5+A_{11} \) |
\(Z_3\) |
|
97 |
\( A_1+A_6+A_{11} \) |
\(1\) |
|
98 |
\( 2 A_1+2 A_2+A_{12} \) |
\(1\) |
|
99 |
\( A_1+A_2+A_3+A_{12} \) |
\(1\) |
|
100 |
\( 2 A_1+A_4+A_{12} \) |
\(1\) |
|
101 |
\( A_2+A_4+A_{12} \) |
\(1\) |
|
102 |
\( A_1+A_5+A_{12} \) |
\(1\) |
|
103 |
\( A_6+A_{12} \) |
\(1\) |
|
104 |
\( 3 A_1+A_2+A_{13} \) |
\(Z_2\) |
|
105 |
\( A_1+2 A_2+A_{13} \) |
\(1\) |
|
106 |
\( A_1+2 A_2+A_{13} \) |
\(Z_2\) |
|
107 |
\( 2 A_1+A_3+A_{13} \) |
\(Z_2\) |
|
108 |
\( A_2+A_3+A_{13} \) |
\(1\) |
|
109 |
\( A_1+A_4+A_{13} \) |
\(1\) |
|
110 |
\( A_1+A_4+A_{13} \) |
\(Z_2\) |
|
111 |
\( A_5+A_{13} \) |
\(1\) |
|
112 |
\( 2 A_1+A_2+A_{14} \) |
\(1\) |
|
113 |
\( 2 A_1+A_2+A_{14} \) |
\(Z_3\) |
|
114 |
\( 2 A_2+A_{14} \) |
\(Z_3\) |
|
115 |
\( A_1+A_3+A_{14} \) |
\(1\) |
|
116 |
\( A_4+A_{14} \) |
\(1\) |
|
117 |
\( 3 A_1+A_{15} \) |
\(Z_4\) |
|
118 |
\( A_1+A_2+A_{15} \) |
\(1\) |
|
119 |
\( A_1+A_2+A_{15} \) |
\(Z_2\) |
|
120 |
\( A_3+A_{15} \) |
\(Z_4\) |
|
121 |
\( 2 A_1+A_{16} \) |
\(1\) |
|
122 |
\( A_2+A_{16} \) |
\(1\) |
|
123 |
\( A_1+A_{17} \) |
\(1\) |
|
124 |
\( A_1+A_{17} \) |
\(Z_3\) |
|
125 |
\( A_{18} \) |
\(1\) |
|
126 |
\( A_1+A_3+A_4+A_5+D_5 \) |
\(Z_2\) |
|
127 |
\( 2 A_4+A_5+D_5 \) |
\(1\) |
|
128 |
\( A_3+2 A_5+D_5 \) |
\(Z_2\) |
|
129 |
\( 2 A_2+A_3+A_6+D_5 \) |
\(1\) |
|
130 |
\( A_1+A_2+A_4+A_6+D_5 \) |
\(1\) |
|
131 |
\( A_2+A_5+A_6+D_5 \) |
\(1\) |
|
132 |
\( A_1+2 A_6+D_5 \) |
\(1\) |
|
133 |
\( A_1+A_2+A_3+A_7+D_5 \) |
\(Z_4\) |
|
134 |
\( 2 A_1+A_4+A_7+D_5 \) |
\(Z_2\) |
|
135 |
\( A_1+A_4+A_8+D_5 \) |
\(1\) |
|
136 |
\( A_5+A_8+D_5 \) |
\(1\) |
|
137 |
\( 2 A_1+A_2+A_9+D_5 \) |
\(Z_2\) |
|
138 |
\( 2 A_2+A_9+D_5 \) |
\(1\) |
|
139 |
\( A_1+A_3+A_9+D_5 \) |
\(Z_2\) |
|
140 |
\( A_4+A_9+D_5 \) |
\(1\) |
|
141 |
\( A_1+A_2+A_{10}+D_5 \) |
\(1\) |
|
142 |
\( 2 A_1+A_{11}+D_5 \) |
\(Z_4\) |
|
143 |
\( A_2+A_{11}+D_5 \) |
\(Z_2\) |
|
144 |
\( A_1+A_{12}+D_5 \) |
\(1\) |
|
145 |
\( A_{13}+D_5 \) |
\(1\) |
|
146 |
\( 2 A_4+2 D_5 \) |
\(1\) |
|
147 |
\( A_1+A_7+2 D_5 \) |
\(Z_4\) |
|
148 |
\( A_8+2 D_5 \) |
\(1\) |
|
149 |
\( 3 D_6 \) |
\(Z_2^2\) |
|
150 |
\( 2 A_2+2 A_4+D_6 \) |
\(1\) |
|
151 |
\( A_1+2 A_3+A_5+D_6 \) |
\(Z_2^2\) |
|
152 |
\( A_3+A_4+A_5+D_6 \) |
\(Z_2\) |
|
153 |
\( 2 A_1+2 A_5+D_6 \) |
\(Z_2^2\) |
|
154 |
\( A_2+A_4+A_6+D_6 \) |
\(1\) |
|
155 |
\( 2 A_6+D_6 \) |
\(1\) |
|
156 |
\( A_1+2 A_2+A_7+D_6 \) |
\(Z_2\) |
|
157 |
\( A_2+A_3+A_7+D_6 \) |
\(Z_2\) |
|
158 |
\( A_1+A_4+A_7+D_6 \) |
\(Z_2\) |
|
159 |
\( A_4+A_8+D_6 \) |
\(1\) |
|
160 |
\( A_1+A_2+A_9+D_6 \) |
\(Z_2\) |
|
161 |
\( A_1+A_2+A_9+D_6 \) |
\(Z_2\) |
|
162 |
\( A_3+A_9+D_6 \) |
\(Z_2\) |
|
163 |
\( A_2+A_{10}+D_6 \) |
\(1\) |
|
164 |
\( A_1+A_{11}+D_6 \) |
\(Z_2\) |
|
165 |
\( A_{12}+D_6 \) |
\(1\) |
|
166 |
\( A_2+A_5+D_5+D_6 \) |
\(Z_2\) |
|
167 |
\( A_7+D_5+D_6 \) |
\(Z_2\) |
|
168 |
\( 2 A_3+2 D_6 \) |
\(Z_2^2\) |
|
169 |
\( A_2+3 A_3+D_7 \) |
\(Z_4\) |
|
170 |
\( A_1+A_2+2 A_4+D_7 \) |
\(1\) |
|
171 |
\( A_2+A_3+A_6+D_7 \) |
\(1\) |
|
172 |
\( A_1+A_4+A_6+D_7 \) |
\(1\) |
|
173 |
\( A_5+A_6+D_7 \) |
\(1\) |
|
174 |
\( 2 A_1+A_2+A_7+D_7 \) |
\(Z_2\) |
|
175 |
\( A_1+A_3+A_7+D_7 \) |
\(Z_4\) |
|
176 |
\( 2 A_1+A_9+D_7 \) |
\(Z_2\) |
|
177 |
\( A_2+A_9+D_7 \) |
\(1\) |
|
178 |
\( A_1+A_{10}+D_7 \) |
\(1\) |
|
179 |
\( A_{11}+D_7 \) |
\(Z_4\) |
|
180 |
\( A_1+A_5+D_5+D_7 \) |
\(Z_2\) |
|
181 |
\( A_5+D_6+D_7 \) |
\(Z_2\) |
|
182 |
\( 2 A_2+2 D_7 \) |
\(1\) |
|
183 |
\( 2 A_2+2 A_3+D_8 \) |
\(Z_2\) |
|
184 |
\( 2 A_1+A_3+A_5+D_8 \) |
\(Z_2^2\) |
|
185 |
\( A_1+A_4+A_5+D_8 \) |
\(Z_2\) |
|
186 |
\( 2 A_5+D_8 \) |
\(Z_2\) |
|
187 |
\( 2 A_2+A_6+D_8 \) |
\(1\) |
|
188 |
\( A_1+A_2+A_7+D_8 \) |
\(Z_2\) |
|
189 |
\( A_1+A_9+D_8 \) |
\(Z_2\) |
|
190 |
\( 2 D_5+D_8 \) |
\(Z_2\) |
|
191 |
\( A_1+A_3+D_6+D_8 \) |
\(Z_2^2\) |
|
192 |
\( 2 A_1+2 D_8 \) |
\(Z_2^2\) |
|
193 |
\( 2 D_9 \) |
\(1\) |
|
194 |
\( A_1+2 A_2+A_4+D_9 \) |
\(1\) |
|
195 |
\( A_1+A_3+A_5+D_9 \) |
\(Z_2\) |
|
196 |
\( A_4+A_5+D_9 \) |
\(1\) |
|
197 |
\( A_1+A_2+A_6+D_9 \) |
\(1\) |
|
198 |
\( 2 A_1+A_7+D_9 \) |
\(Z_2\) |
|
199 |
\( A_1+A_8+D_9 \) |
\(1\) |
|
200 |
\( A_9+D_9 \) |
\(1\) |
|
201 |
\( A_4+D_5+D_9 \) |
\(1\) |
|
202 |
\( 2 A_1+2 A_3+D_{10} \) |
\(Z_2^2\) |
|
203 |
\( A_1+A_3+A_4+D_{10} \) |
\(Z_2\) |
|
204 |
\( 2 A_4+D_{10} \) |
\(1\) |
|
205 |
\( 3 A_1+A_5+D_{10} \) |
\(Z_2^2\) |
|
206 |
\( A_3+A_5+D_{10} \) |
\(Z_2\) |
|
207 |
\( A_2+A_6+D_{10} \) |
\(1\) |
|
208 |
\( A_8+D_{10} \) |
\(1\) |
|
209 |
\( A_1+A_2+D_5+D_{10} \) |
\(Z_2\) |
|
210 |
\( A_2+D_6+D_{10} \) |
\(Z_2\) |
|
211 |
\( A_1+D_7+D_{10} \) |
\(Z_2\) |
|
212 |
\( 2 A_2+A_3+D_{11} \) |
\(1\) |
|
213 |
\( A_1+A_2+A_4+D_{11} \) |
\(1\) |
|
214 |
\( A_2+A_5+D_{11} \) |
\(1\) |
|
215 |
\( A_1+A_6+D_{11} \) |
\(1\) |
|
216 |
\( 2 A_1+2 A_2+D_{12} \) |
\(Z_2\) |
|
217 |
\( A_1+A_2+A_3+D_{12} \) |
\(Z_2\) |
|
218 |
\( 2 A_1+A_4+D_{12} \) |
\(Z_2\) |
|
219 |
\( A_1+D_5+D_{12} \) |
\(Z_2\) |
|
220 |
\( D_6+D_{12} \) |
\(Z_2\) |
|
221 |
\( A_1+A_4+D_{13} \) |
\(1\) |
|
222 |
\( A_5+D_{13} \) |
\(1\) |
|
223 |
\( D_5+D_{13} \) |
\(1\) |
|
224 |
\( 2 A_1+A_2+D_{14} \) |
\(Z_2\) |
|
225 |
\( 2 A_2+D_{14} \) |
\(1\) |
|
226 |
\( A_1+A_3+D_{14} \) |
\(Z_2\) |
|
227 |
\( A_4+D_{14} \) |
\(1\) |
|
228 |
\( A_1+A_2+D_{15} \) |
\(1\) |
|
229 |
\( 2 A_1+D_{16} \) |
\(Z_2\) |
|
230 |
\( A_2+D_{16} \) |
\(Z_2\) |
|
231 |
\( A_1+D_{17} \) |
\(1\) |
|
232 |
\( D_{18} \) |
\(1\) |
|
233 |
\( 3 E_6 \) |
\(Z_3\) |
|
234 |
\( A_1+A_3+2 A_4+E_6 \) |
\(1\) |
|
235 |
\( 2 A_2+A_3+A_5+E_6 \) |
\(Z_3\) |
|
236 |
\( A_3+A_4+A_5+E_6 \) |
\(1\) |
|
237 |
\( A_2+2 A_5+E_6 \) |
\(Z_3\) |
|
238 |
\( A_1+A_2+A_3+A_6+E_6 \) |
\(1\) |
|
239 |
\( 2 A_1+A_4+A_6+E_6 \) |
\(1\) |
|
240 |
\( A_2+A_4+A_6+E_6 \) |
\(1\) |
|
241 |
\( A_1+A_5+A_6+E_6 \) |
\(1\) |
|
242 |
\( A_1+A_4+A_7+E_6 \) |
\(1\) |
|
243 |
\( A_5+A_7+E_6 \) |
\(1\) |
|
244 |
\( 2 A_1+A_2+A_8+E_6 \) |
\(Z_3\) |
|
245 |
\( 2 A_2+A_8+E_6 \) |
\(Z_3\) |
|
246 |
\( A_1+A_3+A_8+E_6 \) |
\(1\) |
|
247 |
\( A_4+A_8+E_6 \) |
\(1\) |
|
248 |
\( A_1+A_2+A_9+E_6 \) |
\(1\) |
|
249 |
\( A_3+A_9+E_6 \) |
\(1\) |
|
250 |
\( 2 A_1+A_{10}+E_6 \) |
\(1\) |
|
251 |
\( A_2+A_{10}+E_6 \) |
\(1\) |
|
252 |
\( A_1+A_{11}+E_6 \) |
\(1\) |
|
253 |
\( A_1+A_{11}+E_6 \) |
\(Z_3\) |
|
254 |
\( A_{12}+E_6 \) |
\(1\) |
|
255 |
\( A_3+A_4+D_5+E_6 \) |
\(1\) |
|
256 |
\( A_1+A_6+D_5+E_6 \) |
\(1\) |
|
257 |
\( A_7+D_5+E_6 \) |
\(1\) |
|
258 |
\( A_2+A_4+D_6+E_6 \) |
\(1\) |
|
259 |
\( A_6+D_6+E_6 \) |
\(1\) |
|
260 |
\( A_1+A_4+D_7+E_6 \) |
\(1\) |
|
261 |
\( D_5+D_7+E_6 \) |
\(1\) |
|
262 |
\( A_4+D_8+E_6 \) |
\(1\) |
|
263 |
\( A_1+A_2+D_9+E_6 \) |
\(1\) |
|
264 |
\( A_3+D_9+E_6 \) |
\(1\) |
|
265 |
\( A_1+D_{11}+E_6 \) |
\(1\) |
|
266 |
\( D_{12}+E_6 \) |
\(1\) |
|
267 |
\( 2 A_3+2 E_6 \) |
\(1\) |
|
268 |
\( A_1+A_5+2 E_6 \) |
\(Z_3\) |
|
269 |
\( A_6+2 E_6 \) |
\(1\) |
|
270 |
\( D_6+2 E_6 \) |
\(1\) |
|
271 |
\( 2 A_2+A_3+A_4+E_7 \) |
\(1\) |
|
272 |
\( A_1+2 A_3+A_4+E_7 \) |
\(Z_2\) |
|
273 |
\( A_1+A_2+A_3+A_5+E_7 \) |
\(Z_2\) |
|
274 |
\( 2 A_3+A_5+E_7 \) |
\(Z_2\) |
|
275 |
\( 2 A_1+A_4+A_5+E_7 \) |
\(Z_2\) |
|
276 |
\( A_2+A_4+A_5+E_7 \) |
\(1\) |
|
277 |
\( A_1+2 A_2+A_6+E_7 \) |
\(1\) |
|
278 |
\( A_2+A_3+A_6+E_7 \) |
\(1\) |
|
279 |
\( A_1+A_4+A_6+E_7 \) |
\(1\) |
|
280 |
\( A_5+A_6+E_7 \) |
\(1\) |
|
281 |
\( 2 A_1+A_2+A_7+E_7 \) |
\(Z_2\) |
|
282 |
\( 2 A_2+A_7+E_7 \) |
\(1\) |
|
283 |
\( A_1+A_3+A_7+E_7 \) |
\(Z_2\) |
|
284 |
\( A_4+A_7+E_7 \) |
\(1\) |
|
285 |
\( A_1+A_2+A_8+E_7 \) |
\(1\) |
|
286 |
\( A_3+A_8+E_7 \) |
\(1\) |
|
287 |
\( 2 A_1+A_9+E_7 \) |
\(Z_2\) |
|
288 |
\( A_2+A_9+E_7 \) |
\(1\) |
|
289 |
\( A_2+A_9+E_7 \) |
\(Z_2\) |
|
290 |
\( A_1+A_{10}+E_7 \) |
\(1\) |
|
291 |
\( A_{11}+E_7 \) |
\(1\) |
|
292 |
\( A_2+A_4+D_5+E_7 \) |
\(1\) |
|
293 |
\( A_1+A_5+D_5+E_7 \) |
\(Z_2\) |
|
294 |
\( A_6+D_5+E_7 \) |
\(1\) |
|
295 |
\( A_2+A_3+D_6+E_7 \) |
\(Z_2\) |
|
296 |
\( A_5+D_6+E_7 \) |
\(Z_2\) |
|
297 |
\( D_5+D_6+E_7 \) |
\(Z_2\) |
|
298 |
\( A_1+A_3+D_7+E_7 \) |
\(Z_2\) |
|
299 |
\( A_4+D_7+E_7 \) |
\(1\) |
|
300 |
\( A_1+A_2+D_8+E_7 \) |
\(Z_2\) |
|
301 |
\( A_2+D_9+E_7 \) |
\(1\) |
|
302 |
\( A_1+D_{10}+E_7 \) |
\(Z_2\) |
|
303 |
\( D_{11}+E_7 \) |
\(1\) |
|
304 |
\( A_2+A_3+E_6+E_7 \) |
\(1\) |
|
305 |
\( A_1+A_4+E_6+E_7 \) |
\(1\) |
|
306 |
\( A_5+E_6+E_7 \) |
\(1\) |
|
307 |
\( D_5+E_6+E_7 \) |
\(1\) |
|
308 |
\( 2 A_2+2 E_7 \) |
\(1\) |
|
309 |
\( A_1+A_3+2 E_7 \) |
\(Z_2\) |
|
310 |
\( A_4+2 E_7 \) |
\(1\) |
|
311 |
\( D_4+2 E_7 \) |
\(Z_2\) |
|
312 |
\( 2 A_2+2 A_3+E_8 \) |
\(1\) |
|
313 |
\( A_1+A_2+A_3+A_4+E_8 \) |
\(1\) |
|
314 |
\( 2 A_1+2 A_4+E_8 \) |
\(1\) |
|
315 |
\( A_2+A_3+A_5+E_8 \) |
\(1\) |
|
316 |
\( A_1+A_4+A_5+E_8 \) |
\(1\) |
|
317 |
\( 2 A_5+E_8 \) |
\(1\) |
|
318 |
\( 2 A_1+A_2+A_6+E_8 \) |
\(1\) |
|
319 |
\( 2 A_2+A_6+E_8 \) |
\(1\) |
|
320 |
\( A_1+A_3+A_6+E_8 \) |
\(1\) |
|
321 |
\( A_4+A_6+E_8 \) |
\(1\) |
|
322 |
\( A_1+A_2+A_7+E_8 \) |
\(1\) |
|
323 |
\( 2 A_1+A_8+E_8 \) |
\(1\) |
|
324 |
\( A_2+A_8+E_8 \) |
\(1\) |
|
325 |
\( A_1+A_9+E_8 \) |
\(1\) |
|
326 |
\( A_{10}+E_8 \) |
\(1\) |
|
327 |
\( A_1+A_4+D_5+E_8 \) |
\(1\) |
|
328 |
\( A_5+D_5+E_8 \) |
\(1\) |
|
329 |
\( 2 D_5+E_8 \) |
\(1\) |
|
330 |
\( 2 A_2+D_6+E_8 \) |
\(1\) |
|
331 |
\( A_4+D_6+E_8 \) |
\(1\) |
|
332 |
\( A_1+A_2+D_7+E_8 \) |
\(1\) |
|
333 |
\( A_1+D_9+E_8 \) |
\(1\) |
|
334 |
\( D_{10}+E_8 \) |
\(1\) |
|
335 |
\( A_1+A_3+E_6+E_8 \) |
\(1\) |
|
336 |
\( A_4+E_6+E_8 \) |
\(1\) |
|
337 |
\( D_4+E_6+E_8 \) |
\(1\) |
|
338 |
\( A_1+A_2+E_7+E_8 \) |
\(1\) |
|
339 |
\( A_3+E_7+E_8 \) |
\(1\) |
|
340 |
\( 2 A_1+2 E_8 \) |
\(1\) |
|
341 |
\( A_2+2 E_8 \) |
\(1\) |
|