| Dr. Robert L. Griess Jr. is a Professor of Mathematics at the University of Michigan and has received various honors including a Guggenheim fellowship, an invited lecture at the International Congress of Mathematicians, membership in the American Academy of Arts and Sciences, and the 2010 AMS Leroy R Steele Prize for his seminal construction of the monster group. .. << 查看详细 |
| 1 introduction 1.1 outline of the book 1.2 suggestions for further reading 1.3 notations, background, conventions 2 bilinear forms, quadratic forms and their isometry groups. 2.1 standard results on quadratic forms and reflections, i 2.1.1 principal ideal domains (pids) 2.2 linear algebra 2.2.1 interpretation of nonsingularity 2.2.2 extension of scalars 2.2.3 cyclicity of the values of a rational bilinear form 2.2.4 gram matrix 2.3 discriminant group 2.4 relations between a lattice and sublattices 2.5 involutions on quadratic spaces 2.6 standard results on quadratic forms and reflections, ii 2.6.1 involutions on lattices 2.7 scaled isometries: norm doublers and triplers 3 general results on finite groups and invariant lattices 3.1 discreteness of rational lattices .3.2 finiteness of the isometry group 3.3 construction of a g-invariant bilinear form 3.4 semidirect products and wreath products 3.5 orthogonal decomposition of lattices 4 root lattices of types a, d, e 4.1 background from lie theory 4.2 root lattices, their duals and their isometry groups 4.2.1 definition of the as lattices 4.2.2 definition of the dn lattices 4.2.3 definition of the en lattices 4.2.4 analysis of the an root lattices 4.2.5 analysis of the dn root lattices 4.2.6 more on the isometry groups of type dn 4.2.7 analysis of the en root lattices 5 hermite and minkowski functions 5.1 small ranks and small determinants 5.1.1 table for the minkowski and hermite functions 5.1.2 classifications of small rank, small determinant lattices 5.2 uniqueness of the lattices e6, e7 and es 5.3 more small ranks and small determinants 6 constructions of lattices by use of codes 6.1 definitions and basic results 6.1.1 a construction of the eg-lattice with the binary [8, 4, 4] code 6.1.2 a construction of the es-lattice with the ternary [4, 2, 3] code 6.2 the proofs 6.2.1 about power sets, boolean sums and quadratic forms 6.2.2 uniqueness of the binary [8, 4, 4] code 6.2.3 reed-muller codes 6.2.4 uniqueness of the tetracode 6.2.5 the automorphism group of the tetracode 6.2.6 another characterization of [8, 4, 4]2 6.2.7 uniqueness of the es-lattice implies uniqueness of the binary [8, 4, 4] code 6.3 codes over f7 and a (mod 7)-construction of es 6.3.1 the ac-lattice 7 group theory and representations 7.1 finite groups 7.2 extraspecial p-groups 7.2.1 extraspecial groups and central products 7.2.2 a normal form in an extraspecial group 7.2.3 a classification of extraspecial groups 7.2.4 an application to automorphism groups of extraspecial groups 7.3 group representations 7.3.1 representations of extraspecial p-groups 7.3.2 construction of the brw groups 7.3.3 tensor products 7.4 representation of the brw group g 7.4.1 brw groups as group extensions 8 overview of the barnes-wall lattices 8.1 some properties of the series 8.2 commutator density 8.2.1 equivalence of 2/4-, 3/4-generation and commutator density for dihs 8.2.2 extraspecial groups and commutator density 9 construction and properties of the barnes-wall lattices 9.1 the barnes-wall series and their minimal vectors 9.2 uniqueness for the bw lattices 9.3 properties of the brw groups 9.4 applications to coding theory 9.5 more about minimum vectors 10 even unimodular lattices in small dimensions 10.1 classifications of even unimodular lattices 10.2 constructions of some niemeier lattices 10.2.1 construction of a leech lattice 10.3 basic theory of the golay code 10.3.1 characterization of certain reed-muller codes 10.3.2 about the golay code 10.3.3 the octad triangle and dodecads 10.3.4 a uniqueness theorem for the golay code 10.4 minimal vectors in the leech lattice 10.5 first proof of uniqueness of the leech lattice 10.6 initial results about the leech lattice 10.6.1 an automorphism which moves the standard frame 10.7 turyn-style construction of a leech lattice 10.8 equivariant unimodularizations of even lattices 11 pieces of eight 11.1 leech trios and overlattices 11.2 the order of the group o(a) 11.3 the simplicity of m24 11.4 sublattices of leech and subgroups of the isometry group 11.5 involutions on the leech lattice references index appendix a the finite simple groups |
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