Differential Geometry, Lie Groups and Symmetric Spaces over General Base Fields and Rings

The present book is intended as a textbook and reference work on three topics in the title. Together with a volume in progress on "Groups and Geometric Analysis" it supersedes my "Differential Geometry and Symmetric Spaces," published in 1962. Since that time several branches of the subject, particu

<span>A ninth printing of Helgason's 1978 textbook and reference published by Academic Press, itself a revision of and sequel to his 1962 Differential Geometry and Symmetric Spaces , based in turn on lectures he gave a the University of Chicago in 1958 and later at Columbia and MIT. He begins by exp

Recommended [here](https://math.stackexchange.com/questions/461029/getting-started-with-lie-groups) as a good introduction to Lie theory: > I would suggest you start with chapter 4 of *An Introduction to Manifolds* by Tu, Then study *Lie Groups, Lie Algebras, and Representations: An Elementary Intro

The present book is intended as a textbook and reference work on three topics in the title. Together with a volume in progress on "Groups and Geometric Analysis" it supersedes my "Differential Geometry and Symmetric Spaces," published in 1962. Since that time several branches of the subject, particu