Representation theory of $S_n$ - MathOverflow most recent 30 from http://mathoverflow.net 2013-05-18T19:43:19Z http://mathoverflow.net/feeds/question/62197 http://www.creativecommons.org/licenses/by-nc/2.5/rdf http://mathoverflow.net/questions/62197/representation-theory-of-s-n Representation theory of $S_n$ Rex 2011-04-19T05:58:19Z 2011-04-20T10:20:51Z <p>I need to understand the representation theory of $S_n$ (symmetric group on $n$ letters) and so could someone suggest a good reference for this. There is a similar question on mathoverflow here </p> <p><a href="http://mathoverflow.net/questions/2755/a-learning-roadmap-for-representation-theory" rel="nofollow">http://mathoverflow.net/questions/2755/a-learning-roadmap-for-representation-theory</a> </p> <p>Most of the responses to the above question give references for representation theory of Lie groups. Also the usual reference Fulton and Harris has too many exercises (on which I don't want to spend too much time ) and I find it difficult to read. </p> <p>Another reference which was suggested was Flag varieties by Lakshmibai and Brown. This seems to be a good reference, but are there any other references.</p> <p>EDIT: By mistake I did not notice something in the above mentioned book and so some of my remarks are being edited. Sorry.</p> http://mathoverflow.net/questions/62197/representation-theory-of-s-n/62199#62199 Answer by George for Representation theory of $S_n$ George 2011-04-19T06:25:46Z 2011-04-19T06:25:46Z <p>In my opinion some good references are "Representation theory of the symmetric group" by "James G, Kerber A." and "The representation theory of the symmetric group" (Lecture notes in mathematics) by G.D. James.</p> http://mathoverflow.net/questions/62197/representation-theory-of-s-n/62200#62200 Answer by Sam Nolen for Representation theory of $S_n$ Sam Nolen 2011-04-19T06:26:35Z 2011-04-19T06:26:35Z <p>"The Symmetric Group: Representations, Combinatorial Algorithms, and Symmetric Functions" by Bruce Sagan might be a good place to start.</p> http://mathoverflow.net/questions/62197/representation-theory-of-s-n/62203#62203 Answer by Roland Bacher for Representation theory of $S_n$ Roland Bacher 2011-04-19T06:47:29Z 2011-04-19T06:55:25Z <p>"Group characters, symmetric functions and the Hecke algebra" by D. M. Goldschmidt is also very nice.</p> <p>And there is of course also the classical "Symmetric functions and Hall polynomials" by Macdonald.</p> <p>In a second time you can also have a look at the Okounkov-Vershik approach (perhaps by reading the original paper "A new approach to representation theory of symmetric groups").</p> http://mathoverflow.net/questions/62197/representation-theory-of-s-n/62288#62288 Answer by David Hemmer for Representation theory of $S_n$ David Hemmer 2011-04-19T15:56:04Z 2011-04-19T15:56:04Z <p>Note that both the James and James/Kerber classic books are back in print and available from Amazon. The new book "Representation Theory of the Symmetric Groups" by Ceccherini-Silberstein et al is quite nice.</p> http://mathoverflow.net/questions/62197/representation-theory-of-s-n/62293#62293 Answer by Adam Hughes for Representation theory of $S_n$ Adam Hughes 2011-04-19T16:29:41Z 2011-04-19T16:29:41Z <p>I recommend <em>$\lambda$-Rings and the Representation Theory of the Symmetric Group</em> by Donald Knutson. It helped me a lot. It's #308 in the Springer Lecture Notes series.</p> http://mathoverflow.net/questions/62197/representation-theory-of-s-n/62296#62296 Answer by David Hill for Representation theory of $S_n$ David Hill 2011-04-19T16:35:14Z 2011-04-19T16:35:14Z <p>I guess I should plug Sasha Kleshchev's book "Linear and Projective Representations of Symmetric Groups". Chapter 1 reconstructs the representation theory of symmetric groups from the Jucys-Murphy elements. The remainder of the book puts this representation theory into the larger context of cyclotomic Hecke algebras. </p> <p>I would recommend paying close attention to the intertwining operators that are introduced in Chapter 3. A good exercise would be to use these operators to recover the results of Arun Ram's papers "Calibrated Representations of Affine Hecke Algebras" and "Skew Shape Representation are Irreducible". Once you do this, you will understand Young's semi-normal form, and how to construct irreducible representations of $S_n$ from semi-standard Young tableaux.</p> http://mathoverflow.net/questions/62197/representation-theory-of-s-n/62392#62392 Answer by Amritanshu Prasad for Representation theory of $S_n$ Amritanshu Prasad 2011-04-20T10:20:51Z 2011-04-20T10:20:51Z <p>If you like combinatorics, you may enjoy learning about the representations of $S_n$ by reading Chapter 7 of Stanley's <em>Enumerative Combinatorics</em>, Volume 2.</p>