3
$\begingroup$

Can anyone guide me to a good site for the special linear group $SL(2,R)$, especially one that goes deep into its subgroup and normal subgroup? Book recommendations would be great too.

  • 2
    Probably not really what you're looking for, but it came to mind because I read it recently: http://www.springerlink.com/content/k7585171n6341825/fulltext.pdf It's only really concerened with representation theory in order to do some harmonic analysis, but hopefully you'll find something of interest there.2012-10-26
  • 0
    Google it. A good algebra books is better though.2012-10-26
  • 0
    Actually, book recommendations would be great, also. Thanks2012-10-26
  • 0
    Thank you, @Peter, I think I'd enjoy this2012-10-26

1 Answers 1

6

Read $SL_2(R)$ by Serge Lang. The title is exactly the topic you are looking for!

  • 0
    Who knew? (I guess you did!)2012-11-29