Design theory

Created to teach students many of the most important techniques used for constructing combinatorial designs, this is an ideal textbook for advanced undergraduate and graduate courses in Combinatorial Design Theory. The text features clear explanations of basic designs such as Steiner and Kirkman triple systems, mutually orthogonal Latin squares, finite projective and affine planes, and Steiner quadruple systems. In these settings, the student will master various construction techniques, both classic and modern, and will be well prepared to construct a vast array of combinatorial designs. Design Theory offers a progressive approach to the subject, with carefully ordered results. It begins with simple constructions that gradually increase in complexity. Each design has a construction that contains new ideas, or that reinforces and builds upon similar ideas previously introduced. The many illustrations aid in understanding and enjoying the application of the constructions described. Written by professors with the needs of students in mind, this is destined to become the standard textbook for design theory.

Steiner Triple Systems The Existence Problem u 3 (mod 6): The Bose Construction u 1 (mod 6): The Skolem Construction u 5 (mod 6): The 6n + 5 Construction Quasigroups with Holes and Steiner Triple Systems Constructing Quasigroups with Holes Constructing Steiner Triple Systems using Quasigroups with Holes The Wilson Construction Cyclic Steiner Triple Systems l-Fold Triple Systems Triple Systems of Index l > 1 The Existence of Idempotent Latin Squares 2-Fold Triple Systems Constructing 2-Fold Triple Systems l = 3 and 6 l-Fold Triple Systems in General Maximum Packings and Minimum Coverings The General Problem Maximum Packings Minimum Coverings Kirkman Triple Systems A Recursive Construction Constructing Pairwise Balanced Designs Mutually Orthogonal Latin Squares Introduction The Euler and MacNeish Conjectures Disproof of the MacNeish Conjecture Disproof of the Euler Conjecture Orthogonal Latin Squares of Order n 2 (mod 4) Affine and Projective Planes Affine Planes Projective Planes Connections between Affine and Projective Planes Connections between Affine Planes and Complete Sets of MOLS (n) Coordinating the Affine Planes Steiner Quadruple Systems Introduction Constructions of Steiner Quadruple Systems The Stern and Lenz Lemma The (3u - 2u)-Construction Appendices A. Cyclic Steiner Triple Systems B. Answers to Selected Exercises Index