1. Dokovic, D.Z., Hofmann, K.H.: The surjectivity question for the exponential function of real lie groups. J. Lie Theory 7, 171–199 (1997)

2. Cornwell, J.F.: Group Theory in Physics I, II, III. Academic Press, Waltham 1984, 1986, 1989 (The first volume covers basic group theory, Lie groups, representations and applications to nonrelativistic physics, the second volume Lie algebras, the connection between Lie algebras and Lie groups, and the third volume discusses supersymmetry and infinite dimensional Lie algebras.)

3. Jones, H.F.: Groups, Representations and Physics. Institute of Physics Publishing (1990) (Not aimed at completeness, clear in its presentation, and therefore very useful for physical applications.)

4. Corwin, I., Ne’eman, Y., Sternberg, S.: Graded lie algebras in mathematics and physics (Bose-Fermi symmetry). Rev. Mod. Phys. 47, 573–603 (1975)

5. Baker, A.: Matrix Groups: An Introduction to Lie Group Theory. Springer, New York (2003) (This is a particularly useful text because the groups used in this book are mostly matrix groups.)