Rational lattices occur naturally in many areas of mathematics,such as num-ber theory,geometry,combinatories,representation theory,discrete mathematics,finite groups and Lie theory.
　　The main goal of this book is to explain methods for construction and analysisof positive definite rational lattices and their finite groups of isometries.
　　It seems that many lattices of great interest are related to finite groups andvice versa.One thinks of root lattices,the Barnes-Wall lattices,the Leech latticeand others which occur as sublattices or overlattices of these.The Leech lattice isclosely related to twenty of the twenty-six sporadic simple groups.Many latticeswith relatively high minimum norms have interesting finite isometry groups.
　　Materials in this book are similar to that in graduate courses we gave duringthe 2000s decade at the University of Michigan in Ann Arbor,USA and ZhejiangUniversity in Hangzhou,China.We present group theory and lattice theory asclosely interrelated subjects.
　　Many topics in the theory of lattices and the theory of groups shall be treatedfrom first principles and proofs will be self-contained.Our presentation is moreclassroom style or conversational than encyclopedic.We try to provide clear intro-ductions,give examples and indicate directions.If a full treatment would be longand is otherwise available in publications,we may refer to outside sources.