Table T4

Algebra (L)

Fundamental group (H)

Generators of H (k)

\( 6 A_3 \)

\(Z_4^2\)

0	1	1	1	1	2
1	0	1	2	3	1

\( 2 A_2+2 A_3+2 A_4 \)

\(1\)

\( 2 A_1+4 A_4 \)

\(Z_5\)

\( A_1+A_2+2 A_3+A_4+A_5 \)

\(Z_2\)

\( 4 A_2+2 A_5 \)

\(Z_3^2\)

0	0	1	1	2	2
1	1	0	0	2	4

\( A_1+2 A_2+A_3+2 A_5 \)

\(Z_6\)

\( 2 A_1+2 A_3+2 A_5 \)

\(Z_2^2\)

0	1	2	2	0	3
1	0	2	2	3	0

\( 2 A_2+A_4+2 A_5 \)

\(Z_3\)

\( A_1+A_3+A_4+2 A_5 \)

\(Z_2\)

\( 2 A_4+2 A_5 \)

\(1\)

\( 3 A_1+3 A_5 \)

\(Z_2 Z_6\)

0	1	1	0	3	3
1	0	1	1	1	4

\( A_3+3 A_5 \)

\(Z_6\)

\( 3 A_6 \)

\(Z_7\)

\( A_1+2 A_2+A_3+A_4+A_6 \)

\(1\)

\( A_2+2 A_3+A_4+A_6 \)

\(1\)

\( 2 A_1+A_2+2 A_4+A_6 \)

\(1\)

\( A_1+A_3+2 A_4+A_6 \)

\(1\)

\( A_1+2 A_3+A_5+A_6 \)

\(Z_2\)

\( A_1+A_2+A_4+A_5+A_6 \)

\(1\)

\( A_3+A_4+A_5+A_6 \)

\(1\)

\( 2 A_1+2 A_5+A_6 \)

\(Z_2\)

\( 2 A_1+2 A_2+2 A_6 \)

\(1\)

\( 2 A_3+2 A_6 \)

\(1\)

\( A_2+A_4+2 A_6 \)

\(1\)

\( 2 A_1+3 A_3+A_7 \)

\(Z_2 Z_4\)

0	0	1	1	2	2
1	1	0	0	2	4

\( A_2+3 A_3+A_7 \)

\(Z_4\)

\( 2 A_1+A_2+A_3+A_4+A_7 \)

\(Z_2\)

\( 2 A_2+A_3+A_4+A_7 \)

\(1\)

\( 3 A_1+A_3+A_5+A_7 \)

\(Z_2^2\)

0	0	1	0	3	4
1	1	0	2	0	4

\( A_1+A_2+A_3+A_5+A_7 \)

\(Z_2\)

\( 2 A_1+A_4+A_5+A_7 \)

\(Z_2\)

\( A_2+A_4+A_5+A_7 \)

\(1\)

\( A_1+2 A_5+A_7 \)

\(Z_2\)

\( A_1+2 A_2+A_6+A_7 \)

\(1\)

\( 2 A_1+A_3+A_6+A_7 \)

\(Z_2\)

\( A_2+A_3+A_6+A_7 \)

\(1\)

\( A_1+A_4+A_6+A_7 \)

\(1\)

\( A_5+A_6+A_7 \)

\(1\)

\( 4 A_1+2 A_7 \)

\(Z_2 Z_4\)

0	0	1	1	2	2
1	1	1	1	0	4

\( 2 A_2+2 A_7 \)

\(1\)

\( 2 A_2+2 A_7 \)

\(Z_2\)

\( A_1+A_3+2 A_7 \)

\(Z_8\)

\( A_1+3 A_2+A_3+A_8 \)

\(Z_3\)

\( 3 A_2+A_4+A_8 \)

\(Z_3\)

\( A_1+A_2+A_3+A_4+A_8 \)

\(1\)

\( 2 A_1+2 A_4+A_8 \)

\(1\)

\( A_1+2 A_2+A_5+A_8 \)

\(Z_3\)

\( A_2+A_3+A_5+A_8 \)

\(Z_3\)

\( A_1+A_4+A_5+A_8 \)

\(1\)

\( 2 A_1+A_2+A_6+A_8 \)

\(1\)

\( A_1+A_3+A_6+A_8 \)

\(1\)

\( A_4+A_6+A_8 \)

\(1\)

\( A_1+A_2+A_7+A_8 \)

\(1\)

\( 2 A_1+2 A_8 \)

\(1\)

\( 2 A_1+2 A_8 \)

\(Z_3\)

\( 2 A_9 \)

\(1\)

\( 2 A_9 \)

\(Z_5\)

\( 2 A_1+2 A_2+A_3+A_9 \)

\(Z_2\)

\( A_1+A_2+2 A_3+A_9 \)

\(Z_2\)

\( 3 A_1+A_2+A_4+A_9 \)

\(Z_2\)

\( 2 A_1+A_3+A_4+A_9 \)

\(Z_2\)

\( A_1+2 A_4+A_9 \)

\(Z_5\)

\( 2 A_1+A_2+A_5+A_9 \)

\(Z_2\)

\( A_1+A_3+A_5+A_9 \)

\(Z_2\)

\( A_1+A_3+A_5+A_9 \)

\(Z_2\)

\( A_4+A_5+A_9 \)

\(1\)

\( A_4+A_5+A_9 \)

\(Z_2\)

\( 3 A_1+A_6+A_9 \)

\(Z_2\)

\( A_1+A_2+A_6+A_9 \)

\(1\)

\( A_3+A_6+A_9 \)

\(1\)

\( A_2+A_7+A_9 \)

\(1\)

\( A_1+A_8+A_9 \)

\(1\)

\( A_1+2 A_2+A_3+A_{10} \)

\(1\)

\( A_2+2 A_3+A_{10} \)

\(1\)

\( 2 A_1+A_2+A_4+A_{10} \)

\(1\)

\( 2 A_2+A_4+A_{10} \)

\(1\)

\( A_1+A_3+A_4+A_{10} \)

\(1\)

\( 2 A_4+A_{10} \)

\(1\)

\( A_1+A_2+A_5+A_{10} \)

\(1\)

\( A_3+A_5+A_{10} \)

\(1\)

\( 2 A_1+A_6+A_{10} \)

\(1\)

\( A_2+A_6+A_{10} \)

\(1\)

\( A_1+A_7+A_{10} \)

\(1\)

\( A_8+A_{10} \)

\(1\)

\( 3 A_1+2 A_2+A_{11} \)

\(Z_6\)

\( A_1+3 A_2+A_{11} \)

\(Z_3\)

\( 2 A_1+A_2+A_3+A_{11} \)

\(Z_2\)

\( 2 A_1+A_2+A_3+A_{11} \)

\(Z_4\)

\( 2 A_2+A_3+A_{11} \)

\(Z_3\)

\( 2 A_2+A_3+A_{11} \)

\(Z_6\)

\( A_1+2 A_3+A_{11} \)

\(Z_4\)

\( 3 A_1+A_4+A_{11} \)

\(Z_2\)

\( A_1+A_2+A_4+A_{11} \)

\(1\)

\( 2 A_1+A_5+A_{11} \)

\(Z_2\)

\( 2 A_1+A_5+A_{11} \)

\(Z_6\)

\( A_2+A_5+A_{11} \)

\(Z_3\)

\( A_1+A_6+A_{11} \)

\(1\)

\( 2 A_1+2 A_2+A_{12} \)

\(1\)

\( A_1+A_2+A_3+A_{12} \)

\(1\)

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

\( 3 D_6 \)

\(Z_2^2\)

s	s	v
c	v	s

150

\( 2 A_2+2 A_4+D_6 \)

\(1\)

151

\( A_1+2 A_3+A_5+D_6 \)

\(Z_2^2\)

0	0	2	3	s
1	2	0	3	v

152

\( A_3+A_4+A_5+D_6 \)

\(Z_2\)

153

\( 2 A_1+2 A_5+D_6 \)

\(Z_2^2\)

0	0	3	3	v
1	1	0	3	s

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

\( 2 A_3+2 D_6 \)

\(Z_2^2\)

0	2	s	s
2	0	c	c

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

\( 2 A_1+A_3+A_5+D_8 \)

\(Z_2^2\)

0	1	0	3	s
1	0	2	3	v

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

\( A_1+A_3+D_6+D_8 \)

\(Z_2^2\)

0	2	v	s
1	0	s	c

192

\( 2 A_1+2 D_8 \)

\(Z_2^2\)

0	0	s	s
1	1	c	v

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

\( 2 A_1+2 A_3+D_{10} \)

\(Z_2^2\)

0	1	0	2	s
1	0	2	0	c

203

\( A_1+A_3+A_4+D_{10} \)

\(Z_2\)

204

\( 2 A_4+D_{10} \)

\(1\)

205

\( 3 A_1+A_5+D_{10} \)

\(Z_2^2\)

0	0	0	3	s
1	1	1	0	c

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

\( A_2+2 E_8 \)

\(1\)