CUPM Report, Volumes 16-18 |
Contents
INTRODUCTION | 1 |
APPLICATIONS OF GEOMETRY | 7 |
CONVEX SETS AND THE COMBINATORIAL | 43 |
Copyright | |
2 other sections not shown
Common terms and phrases
affine space angle assume axioms barycentric coordinates bounded Branko Grünbaum calculus circles closed convex set compact conic consider conv convex hull convex set coordinates corresponding course Coxeter curve d-polytope defined definition denote derivative determined differential discussion edges equation equiaffinity Euclidean geometry example exists extreme points facets finite formula Fréchet derivative given Gleason graph Grünbaum H. S. M. Coxeter halfspaces Helly's theorem hyperbolic space hyperplane implies inequality integral intersection inversive plane isometry Jordan content k-dimensional K₁ K₂ Klee lecture linear algebra linear transformations mapping mathematics matrix metric number of vertices orthogonal parallel pencil perpendicular polygon poonem Prenowitz problem proof properties prove real numbers reflections rel int result rotation scalar segment solution sphere Steenrod subset tangent tion topological translation triangle variables vector space vertex volume