Includes bibliographical references (pages 405-407) and indexes
"Supermanifolds and Supergroups explains the basic ingredients of supermanifolds and super Lie groups. It starts with super linear algebra and follows with a treatment of super smooth functions and the basic definition of a supermanifold. When discussing the tangent bundle, integration of vector fields is treated as well as the machinery of differential forms. For super Lie groups the standard results are shown, including the construction of a super Lie group for any super Lie algebra. The last chapter is entirely devoted to super connections." "The book requires standard undergraduate knowledge on super differential geometry and super Lie groups. Some knowledge of ordinary differential geometry is helpful when reading the text."--Jacket