Handbook of Applicable Mathematics, Combinatorics and GeometryWalter Ledermann, Steven Vajda |
Contents
INTRODUCTION xiii | 323 |
SYMMETRY | 329 |
DIFFERENTIAL GEOMETRY | 423 |
Copyright | |
6 other sections not shown
Common terms and phrases
a₁ algebra analytic angle axis BCH code binary block codes codeword coefficient column convolutional code coordinates corresponding crystallographic curvature curve cyclic code decoding defined DEFINITION denote differential disk patterns dmin e₁ elements encoder equation equivalent error pattern EXAMPLE Figure finite follows formula geodesic geometric GF q Gilbert bound given group G Hamming Hamming codes Hamming weight Hence henomeric type homeomeric types integers inverse isometries isomorphic lattice Lie group linear code linear recursion linearly independent mathematical matrix minimum distance multiset n-set n-tuples non-zero notation obtain orthogonal osculating osculating plane parametrization parity-check matrix partition permutations plane polynomial problem PROPOSITION q-ary reflection S₁ S₂ satisfies sequence subgroup subsets subspace surface symmetric functions symmetry group symmetry type tangent vector Theorem theory topological topological group transformation translation V₁ vector field vector space vertices x₁ zero