This is the first exposition of the theory of quasi-symmetric
designs, that is, combinatorial designs with at most two block
intersection numbers. The authors aim to bring out the interaction
among designs, finite geometries, and strongly regular graphs. The
book starts with basic, classical material on designs and strongly
regular graphs and continues with a discussion of some important
results on quasi-symmetric designs. The later chapters include a
combinatorial construction of the Witt designs from the projective
plane of order four, recent results dealing with a structural study
of designs resulting from Cameron's classification theory on
extensions of symmetric designs, and results on the classification
problem of quasi-symmetric designs. The final chapter presents
connections to coding theory.
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