But "A Student's Guide to Vectors and Tensors" (author Daniel Fleisch) is the first actual book I've found that (i) is pitched at a genuinely introductory level, assuming about first year university maths (ii) adopts an explanatory approach rather that the usual tedious 'endless succession of proofs' approach so beloved of many maths authors (think: Dover editions !) (iii) has many exercises, and worked solutions on the author's web site.
I like the way the author takes time to very slowly and carefully explain confusing (to me at least) yet not necessarily difficult areas such as Contraveriant vs Covariant representations; dual bases and more.
I should caution that [...] this book may well be too basic.
Genericcoder said:no actually I want to know it for math related area since I am undergrad student in math I am interested in it because it appears a lot when we deal with Hilbert space etc. I want though a book that gives a well defined definition for tensors.
Genericcoder said:If we take for example the tensor product between two vectors each lives in Hilbert space I know that it has to satisfy certain properties but I can't find a good definition of what exactly is a tensor or a tensor product.
Genericcoder said:For example this is a specific example of what I am talking about and that was also what my professor presented when he was explaining some stuff about C* algebra those aren't really well defined like it doesn't give what specifically what is a tensor ! http://www.quantiki.org/wiki/Tensor_product
micromass said:Firstly, what is a tensor? A tensor on a ##k##-vector space ##V## is just a multilinear map ##V\times ... \times V\rightarrow k##. This is a covariant tensor. A contravariant tensor is a multilinear map ##V^*\times ...\times V^*\rightarrow k##. Then there are also mixed tensors, which are less important for now, they are multilinear maps of the form ##V\times ...\times V\times V^*\times ...\times V^*\rightarrow k##.
The above paragraph is the concrete picture of tensors and is the one used in physics. In mathematics however, we abstract the above picture and we form things called "tensor products of vector spaces". This is what is described in your link. Well, your link is about C*-algebras and Hilbert spaces which are more advanced.
Tensor calculus is a branch of mathematics that deals with the manipulation and properties of tensors, which are geometric objects used to describe physical quantities in multiple dimensions.
Tensor calculus is important because it provides a powerful mathematical framework for describing and analyzing physical phenomena in fields such as physics, engineering, and computer science. It also allows for the development of mathematical models and equations that accurately represent real-world systems.
Tensor calculus has numerous applications in various fields, including general relativity, fluid dynamics, electromagnetism, image processing, and machine learning. It is also used in the development of advanced technologies such as GPS navigation systems and medical imaging devices.
Tensor calculus can be challenging to learn due to its abstract nature and use of advanced mathematical concepts. However, with proper guidance and practice, it can be mastered by individuals with a strong foundation in mathematics and a strong interest in the subject.
Yes, there are many books, online courses, and tutorials available for learning tensor calculus. Some popular books on the subject include "Tensor Calculus for Physics" by Dwight E. Neuenschwander and "A Student's Guide to Vectors and Tensors" by Daniel Fleisch. Additionally, there are many free online resources, such as lectures and videos, that can help individuals learn tensor calculus at their own pace.