Homology from posets

Jones, Philip Robert

January 1999

No description available.

510

Group--Theoretical Structure of the Entangled States of N Identical

Suranjana Rai, Jagdish Rai, Andreas.Cap@esi.ac.at

03 July 2000

No description available.

Character restrictions and multiplicities in symmetric groups

Isaacs, I.M., Navarro, Gabriel, Olsson, Jørn B., Tiep, Pham Huu

05 1900

We give natural correspondences of odd-degree characters of the symmetric groups and some of their subgroups, which can be described easily by restriction of characters, degrees and multiplicities.

Restriction

Multiplicities

Symmetric groups

Odd degree characters

Natural correspondences

The Modern Representation Theory of the Symmetric Groups

Cioppa, Timothy

14 December 2011

The goal of this thesis is to first give an overview of the modern approach, using the paper of A. Vershik and A. Okounkov, to inductively parametrizing all irreducible representations of the symmetric groups. This theory is then used to answer questions concerning to central projections in the group algebra. We index units first by partitions, and then by so called standard tableaux. We also present a new result and discuss future research exploring the connections between this theory and Quantum Information.

Symmetric groups

representation theory

Vershik Okounkov approach

Young diagrams

The Modern Representation Theory of the Symmetric Groups

Cioppa, Timothy

14 December 2011

The goal of this thesis is to first give an overview of the modern approach, using the paper of A. Vershik and A. Okounkov, to inductively parametrizing all irreducible representations of the symmetric groups. This theory is then used to answer questions concerning to central projections in the group algebra. We index units first by partitions, and then by so called standard tableaux. We also present a new result and discuss future research exploring the connections between this theory and Quantum Information.

Symmetric groups

representation theory

Vershik Okounkov approach

Young diagrams

The Modern Representation Theory of the Symmetric Groups

Cioppa, Timothy

14 December 2011

The goal of this thesis is to first give an overview of the modern approach, using the paper of A. Vershik and A. Okounkov, to inductively parametrizing all irreducible representations of the symmetric groups. This theory is then used to answer questions concerning to central projections in the group algebra. We index units first by partitions, and then by so called standard tableaux. We also present a new result and discuss future research exploring the connections between this theory and Quantum Information.

Symmetric groups

representation theory

Vershik Okounkov approach

Young diagrams

The Modern Representation Theory of the Symmetric Groups

Cioppa, Timothy

January 2012

The goal of this thesis is to first give an overview of the modern approach, using the paper of A. Vershik and A. Okounkov, to inductively parametrizing all irreducible representations of the symmetric groups. This theory is then used to answer questions concerning to central projections in the group algebra. We index units first by partitions, and then by so called standard tableaux. We also present a new result and discuss future research exploring the connections between this theory and Quantum Information.

Symmetric groups

representation theory

Vershik Okounkov approach

Young diagrams

Infinite Product Group

Penrod, Keith G.

13 July 2007

The theory of infinite multiplication has been studied in the case of the Hawaiian earring group, and has been seen to simplify the description of that group. In this paper we try to extend the theory of infinite multiplication to other groups and give a few examples of how this can be done. In particular, we discuss the theory as applied to symmetric groups and braid groups. We also give an equivalent definition to K. Eda's infinitary product as the fundamental group of a modified wedge product.

algebra

topology

analysis

braid groups

symmetric groups

permutation groups

Mathematics

Explorations of the Aldous Order on Representations of the Symmetric Group

Newhouse, Jack

31 May 2012

The Aldous order is an ordering of representations of the symmetric group motivated by the Aldous Conjecture, a conjecture about random processes proved in 2009. In general, the Aldous order is very difficult to compute, and the proper relations have yet to be determined even for small cases. However, by restricting the problem down to Young-Jucys-Murphy elements, the problem becomes explicitly combinatorial. This approach has led to many novel insights, whose proofs are simple and elegant. However, there remain many open questions related to the Aldous Order, both in general and for the Young-Jucys-Murphy elements.

20B30 Symmetric Groups

Blocks in Deligne's category Rep(St)

Comes, Jonathan, 1981-

06 1900

x, 81 p. : ill. A print copy of this thesis is available through the UO Libraries. Search the library catalog for the location and call number. / We give an exposition of Deligne's tensor category Rep(St) where t is not necessarily an integer. Thereafter, we give a complete description of the blocks in Rep(St) for arbitrary t. Finally, we use our result on blocks to decompose tensor products and classify tensor ideals in Rep(St). / Committee in charge: Victor Ostrik, Chairperson, Mathematics; Daniel Dugger, Member, Mathematics; Jonathan Brundan, Member, Mathematics; Alexander Kleshchev, Member, Mathematics; Michael Kellman, Outside Member, Chemistry

Tensor categories

Symmetric groups

Decomposed blocks

Tensor product

Tensor ideals

Mathematics

Theoretical mathematics