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COMPUTATIONAL PROBLEMS IN ABSTRACT
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vi Contents E. KRAUSE and K. WESTON
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X Preface I am indebted to the auth
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4 J. Neubiiser 2.3.5. Added in proo
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8 J. Neubiiser Investigations of gr
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12 J. Neubiiser For 1 es 4 r, ws is
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16 J. Neubiiser Investigations of g
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Some examples using coset enumerati
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40 C. M. Campbell Some examples usi
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44 N. S. Mendelsohn for example, in
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48 H. Jiirgensen Calculation with e
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52 H. Jiirgensen Calculation with e
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56 H. Jiirgensen Calculation with e
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60 V. Fe&h and J. Neubiiser 2. The
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64 L. Gerhards and E. Altmann Autom
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68 L. Gerhards and E. Altmann Autom
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72 L. Gerhards and E. Altmann ni E
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76 W. Lindenberg and L. Gerhards Se
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80 W. Lindenberg and L. Gerhards Se
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84 K. Ferber and H. Jiirgensen The
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7 The construction of the character
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92 John McKay defining multiplicati
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96 John McKay Construction of chara
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100 John McKay In the table, c indi
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104 C. Brott and J. Neubiiser irred
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108 C. Brott and J. Neubiiser eleme
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112 J. S. Frame The characters of t
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116 J. S. Frame 3. The decompositio
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120 J. S. Frame The characters of t
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124 J. S. Frame The characters of t
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TABLE 5. The Z, character block for
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132 R. Biilow and J. Neubiiser Deri
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A search for simple groups of order
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140 Marshall Hall Jr. Simple groups
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144 Marshall Hall Jr. Simple groups
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148 Marshall Hall Jr. otherwise no
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152 Marshall Hall Jr. easily found
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156 Marshall Hall Jr. Simple groups
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160 Marshall Hail Jr. This leads to
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164 Marshall Hall Jr. b= (OO)(Ol, 0
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168 Marshall Hall Jr. 11. R. BRAUER
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172 Charles C. Sims THEOREM 2.3. Th
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176 Charles C. Sims has a set of im
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180 Degrc - No. Order t N (-63 Gene
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An algorithm related to the restric
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A module-theoretic computation rela
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192 A. L. Tritter expressed in the
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196 A. L. Tritter a question is mos
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200 John J. Cannon stack. The Cayle
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, I The computation of irreducible
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208 P. G. Ruud and R. Keown product
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212 P. G. Ruud and R. Keown TX wher
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216 P. G. Ruud and R. Keown 4. L. G
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220 N. S. Mendelsohn where it is kn
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224 Robert J. Plemmons such class [
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228 Robert J. Plemmons ! TOTALS Sem
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232 Takayuki Tamura 8” = 0B if an
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236 Takayuki Tamura Case ,Q = {e).
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240 Takayuki Tamura The calculation
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244 Takayuki Tamura We calculate46
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248 Takayuki Tamura Immediately we
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252 Takayuki Tamura Let U be a subs
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256 Takayuki Tamura TABLE 8. AI1 Se
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I The author and R. Dickinson have
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264 Donald E. Knuth and Peter B. Be
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268 Donald E. Knuth and Peter B. Be
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272 Donald E. Knuth and Peter B. Be
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276 Donald E. Knuth and Peter B. Be
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280 Donald E. Knuth and Peter B. Be
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284 Donald E. Knuth and Peter B. Be
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288 Donald E. Knuth and Peter B. Be
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292 Donald E. Knuth and Peter B. Be
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296 Donald E. Knuth and Peter B. Be
- Page 155 and 156: 300 Lowell J. Paige Non-associative
- Page 157 and 158: 304 Lowell J. Paige We may lineariz
- Page 159 and 160: 308 T(n) U(n) 0) [VI R-4 C. M. Glen
- Page 161 and 162: 312 C. M. Glennie where in each cas
- Page 163 and 164: 316 A. D. Keedwell of the elements
- Page 165 and 166: A projective coqfiguration J. W. P.
- Page 167 and 168: The uses of computers in Galois the
- Page 169 and 170: 328 W. D. Maurer mod p; for a facto
- Page 171 and 172: 332 J. H. Conway Enumeration of kno
- Page 173 and 174: J. H. Conway Enumeration of knots a
- Page 175 and 176: 340 J. H. Conway -thus our symmetry
- Page 177 and 178: 344 J. H. Conway 2 string links to
- Page 179 and 180: 348 J. H. Conway 3 and 4 string lin
- Page 181 and 182: 352 Non-alternating J. H. Conway L
- Page 183 and 184: 356 J. H. Conway Alternating 11 cro
- Page 185 and 186: H. F. Trotter Computations in knot
- Page 187 and 188: 364 H. F. Trotter to a. Schubert [1
- Page 189 and 190: 368 Shen Lin sequence of squares, t
- Page 191 and 192: 372 Harvey Cohn We also consider GZ
- Page 193 and 194: 376 Harvey Cohn In the case of Fig.
- Page 195 and 196: 380 Harvey Cohn always dictated by
- Page 197 and 198: 384 Hans Zassenhaus A real root cal
- Page 199 and 200: 388 Hans Zassenhaus the elements A,
- Page 201 and 202: 392 Hans Zassenhaus It is clear fro
- Page 203 and 204: 396 R. E. Kalman Invariant factors
- Page 205: 400 List of participants DR. J. J.