Combinatorial Designs

From the reviews: "This is the first rate textbook in combinatorial design theory, providing an elegant treatment . Topics have been chosen well . The language is clear and crisp. Proofs are carefully presented to convey the main insights, and examples are numerous. A strong feature of the book is the manner in which applications of designs are woven into the text . a valuable text for any course in combinatorial design theory, and will serve as an excellent reference ." (Charles J. Colbourn, Zentralblatt MATH, Vol. 1031, 2004) "This book aims to thoroughly develop the most important techniques used for constructing combinatorial designs. The book provides a detailed and clear exposition of the classical core of combinatorial designs . Readers will master various construction techniques, both classic and modern, and will be well prepared to build a vast array of combinatorial designs. A variety of exercises enhance the books utility as a course text." (LEnseignment Mathematique, Vol. 50 (1-2), 2004) "This excellent introductory textbook is the work of one of the top experts of the field. all of the material in this book is suitable for self-study by graduate students, who will find it provides helpful background information concerning research topics in design theory. Researchers may also find that some of the sections on advanced topics provide a useful reference for material that is not easily accessible in textbook form. (Pter Hajnal, Acta Scientiarum Mathematicaram, Vol. 71, 2005) "The book under review has eleven chapters. There are a dozen or so exercises at the end of each chapter. The book is very well written and well organized. This text should serve as a rich source of interesting research projects for advanced undergraduates. senior undergraduate or beginning graduate level students are the intended audience ." (R. Gregory Taylor, SIGACT News, Vol. 39 (4), 2008)

to Balanced Incomplete Block Designs.- Symmetric BIBDs.- Difference Sets and Automorphisms of Designs.- Hadamard Matrices and Designs.- Resolvable BIBDs.- Latin Squares.- Pairwise Balanced Designs I: Designs with Specified Block Sizes.- Pairwise Balanced Designs II: Minimal Designs.- t-Designs and t-wise Balanced Designs.- Orthogonal Arrays and Codes.- Selected Applications of Combinatorial Designs.