# Algebraic Combinatorics and Quantum Groups ePub download

## by Naihuan Jing

**Author:**Naihuan Jing**ISBN:**9812384464**ISBN13:**978-9812384461**ePub:**1300 kb |**FB2:**1833 kb**Language:**English**Category:**Mathematics**Publisher:**World Scientific Pub Co Inc (July 1, 2003)**Pages:**172**Rating:**4.4/5**Votes:**608**Format:**lrf txt doc mbr

ISBN-13: 978-9812384461. Why is ISBN important? ISBN. Hardcover: 170 pages. Publisher: World Scientific Pub Co Inc (September 1, 2003).

Conference: CBMS Conference on Algebraic Combinatorics, At North Carolina State University, Raleigh, N. This book collects some of the invited talks given at the conference.

Conference: CBMS Conference on Algebraic Combinatorics, At North Carolina State University, Raleigh, NC. Cite this publication. North Carolina State University. The CBMS conference features principal talks delivered by Alain Lascoux, whose talks are separately published by AMS entitled Symmetric Functions and Combinatorial Operators on Polynomials. Do you want to read the rest of this conference paper?

Algebraic combinatorics has evolved into one of the most active areas of mathematics during the last several decades.

Algebraic combinatorics has evolved into one of the most active areas of mathematics during the last several decades. Its recent developments have become more interactive with not only its traditional field representation theory but also algebraic geometry, harmonic analysis and mathematical physics. This book presents articles from some of the key contributors in the area. It covers Hecke algebras, Hall algebras, the Macdonald polynomial and its deviations, and their relations with other fields.

Quantum groups Lie algebras representation theory algebraic combinatorics quantum computation. Vertex representations of quantum affine algebras. Articles Cited by. Title. Proceedings of the National Academy of Sciences 85 (24), 9373-9377, 1988. Vertex operators and Hall-Littlewood symmetric functions. Advances in Mathematics 87 (2), 226-248, 1991. Vertex representations via finite groups and the McKay correspondence. IB Frenkel, N Jing, W Wang

Algebraic combinatorics has evolved into one of the most active areas of mathematics during the last several decades.

Algebraic combinatorics has evolved into one o. .Goodreads helps you keep track of books you want to read. Start by marking Algebraic Combinatorics And Quantum Groups as Want to Read: Want to Read savin. ant to Read.

Algebraic combinatorics and quantum groups. Gerstenhaber . Schack D. Algebras, bialgebras, quantum groups, and algebraic deformation (Contemp. 134, 1992)(L)(T)(22s). 0 Mb. Algebraic foundations of non-commutative differential geometry and quantum groups.

292 NAIHUAN JING We will mainly deal with the orthogonal symmetric functions Q^ (q, t) which are dual basis of.

292 NAIHUAN JING We will mainly deal with the orthogonal symmetric functions Q^ (q, t) which are dual basis of PI'S and thus proportional to P's. The polynomials Q (or PA) are called Macdonald symmetric functions. The second 4W3 can be written in a neat form by the q-Euler's transform in our case: 302 NAIHUAN JING 3. Transition functions In Section 1 we mentioned that the symmetric function X-^,,,X-^. l is not equal to the Macdonald function Q(q, t) when A k 2. However they are related by a hypergeometric function.