Excursion into combinatorial geometry

InhaltsverzeichnisI. Convexity.§1 Convex sets.§2 Faces and supporting hyperplanes.§3 Polarity.§4 Direct sum decompositions.§5 The lower semicontinuity of the operator “exp”.§6 Convex cones.§7 The Farkas Lemma and its generalization.§8 Separable systems of convex cones.II. d-Convexity in normed spaces.§9 The definition of d-convex sets.§10 Support properties of d-convex sets.§11 Properties of d-convex flats.§12 The join of normed spaces.§13 Separability of d-convex sets.§14 The Helly dimension of a set family.§15 d-Star-shaped sets.III. H-convexity.§16 The functional md for vector systems.§17 The ?-displacement Theorem.§18 Lower semicontinuity of the functional md.§19 The definition of H-convex sets.§20 Upper semicontinuity of the H-convex hull.§21 Supporting cones of H-convex bodies.§22 The Helly Theorem for H-convex sets.§23 Some applications of H-convexity.§24 Some remarks on connection between d-convexity and H-convexity.IV. The Szökefalvi-Nagy Problem.§25 The Theorem of Szökefalvi-Nagy and its generalization.§26 Description of vector systems with md H = 2 that are not one-sided.§27 The 2-systems without particular vectors.§28 The 2-system with particular vectors.§29 The compact, convex bodies with md M = 2.§30 Centrally symmetric bodies.V. Borsuk’s partition problem.§31 Formulation of the problem and a survey of results.§32 Bodies of constant width in Euclidean and normed spaces.§33 Borsuk’s problem in normed spaces.VI. Homothetic covering and illumination.§34 The main problem and a survey of results.§35 The hypothesis of Gohberg-Markus-Hadwiger.§36 The infinite values of the functional b, b2032;, c, c2032;,.§37 Inner illumination of convex bodies.§38Estimates for the value of the functional p(K).VII. Combinatorial geometry of belt bodies.§39 The integral respresentation of zonoids.§40 Belt vectors of a compact, convex body.§41 Definition of belt bodies.§42 Solution of the illumination problem for belt bodies.§43 Solution of the Szökefalvi-Nagy problem for belt bodies.§44 Minimal fixing systems.VIII. Some research problems.Author Index.List of Symbols.