I am interested in a description of orbits of the natural $GL(V)$ action on $V^{\otimes d}$. I know this is a classical problem but I tried to find some "good" reference and I couldn't. I'm also interested in orbits of the natural $S_d\times GL(V)$ action on $V^{\otimes d}$. I'm assuming characteristic $0$ but references in finite characteristic are also welcomed.
1
-
$\begingroup$ Can you say more precisely what motivates your third sentence: "I'm also interested ..."? This seems to get outside the usual literature on Schur-Weyl duality. Are there examples? $\endgroup$– Jim HumphreysCommented Feb 4, 2013 at 23:51
Add a comment
|
1 Answer
$\begingroup$
$\endgroup$
See, for instance, Chapter 5 of Goodman and Wallach's book "Symmetry, Representations and Invariants". Another good reference is Procesi's "Lie Groups: An approach through Invariants and Representations".
