It is not easy to know which book is best, at least in my experience, since it depends on you which book will make the most sense. In my experience learning tensor analysis takes time and practice, and I'm still definitely learning.
Here are some books you may consider:
1. James G. Simmonds, "A Brief on tensor analysis", Springer-Verlag, 2nd edition, 1994.
2. A. I. Borisenko and I. E. Tarapov, "Vector and Tensor Analysis with applications", Dover, 1979.
3. James K. Knowles, "Linear Vector Spaces and Cartesian Tensors", Oxford University Press, 1998.
4. I. S. Sokolnikoff, "Tensor Analysis - Theory and Applications to Geometry and Mechanics of Continua", Wiley, 2nd edition, 1964.
which book to use is not always an easy choice
Hello,
It is not easy to know which book is best, at least in my experience, since it depends on you which book will make the most sense. In my experience learning tensor analysis takes time and practice, and I'm still definitely learning.
Here are some books you may consider:
1. James G. Simmonds, "A Brief on tensor analysis", Springer-Verlag, 2nd edition, 1994.
2. A. I. Borisenko and I. E. Tarapov, "Vector and Tensor Analysis with applications", Dover, 1979.
3. James K. Knowles, "Linear Vector Spaces and Cartesian Tensors", Oxford University Press, 1998.
4. I. S. Sokolnikoff, "Tensor Analysis - Theory and Applications to Geometry and Mechanics of Continua", Wiley, 2nd edition, 1964.
5. Here is a short introduction, free on the internet http://samizdat.mines.edu/tensors/ShR6b.pdf
The items 1,2 and 5 are more introductory. Items 3 and 4 are perhaps more advanced, but are within reach.
regards,
Louie
Tensor Book
An excellent free book is at this address
http://www.math.odu.edu/~jhh/counter2.html