Which Books Simplify Weights and Roots in Lie Algebra?

AI Thread Summary
The discussion centers on the challenges faced while studying the concepts of Weights and Roots in Lie Algebra, particularly in the context of Howard Georgi's "Lie Algebra in Particle Physics." Participants suggest alternative resources for better understanding, including "Introduction to Lie Algebras and Representation Theory" by Humphreys and "Lectures on Lie Groups" by Hsiang, noting that the latter is more mathematically focused and lacks physics applications. There is a specific request for a more physics-oriented book, as the current resources are found to be insufficient for the user's needs. The conversation highlights the difficulty in finding materials that bridge the gap between mathematical theory and practical physics applications.
praharmitra
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Hi,

I am currently studying Lie Algebra in Particle Physics' by Howard Georgi. I am finding the notes on Weights and Roots quite confusing. Can anyone suggest another book which explains this bit in a better fashion?
 
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praharmitra said:
Hi,

I am currently studying Lie Algebra in Particle Physics' by Howard Georgi. I am finding the notes on Weights and Roots quite confusing. Can anyone suggest another book which explains this bit in a better fashion?

Humphreys,
Introduction to Lie algebras and representation theory

See also
http://en.wikipedia.org/wiki/Weight_(representation_theory )
 
Last edited by a moderator:
If you are mathematically inclined, this is a good one:

Hsiang - Lectures on Lie groups
 
Thanks for the replies. I will try out the books you have mentioned. However, ii was looking for a book that is more physics orientated. I will try both nonetheless.
 
The one by Brian Hall is nice, but not at all physics oriented. I haven't had time to read the whole book though. The definitions of roots and weights is roughly where I stopped reading, so I can't really comment on the material after that (but the definitions were easy enough to understand).
 
Last edited:
torquil said:
If you are mathematically inclined, this is a good one:

Hsiang - Lectures on Lie groups

Perhaps I should also mention that this one has absolutely nothing to do with physics, i.e. no applications to physics. Just math.
 

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