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Proofs and Confirmations The Story of the Alternating-Sign Matrix Conjecture [Paperback]

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  • Category: Books (Mathematics)
  • Author:  Bressoud, David M.
  • Author:  Bressoud, David M.
  • ISBN-10:  0521666465
  • ISBN-10:  0521666465
  • ISBN-13:  9780521666466
  • ISBN-13:  9780521666466
  • Publisher:  Cambridge University Press
  • Publisher:  Cambridge University Press
  • Pages:  292
  • Pages:  292
  • Binding:  Paperback
  • Binding:  Paperback
  • Pub Date:  01-Oct-1999
  • Pub Date:  01-Oct-1999
  • SKU:  0521666465-11-MPOD
  • SKU:  0521666465-11-MPOD
  • Item ID: 100246049
  • Seller: ShopSpell
  • Ships in: 2 business days
  • Transit time: Up to 5 business days
  • Delivery by: Jul 11 to Jul 13
  • Notes: Brand New Book. Order Now.
An introduction to recent developments in algebraic combinatorics and an illustration of how research in mathematics actually progresses.This is an introduction to recent developments in algebraic combinatorics and an illustration of how research in mathematics actually progresses. The author recounts the story of the search for and discovery of a proof of a counting formula conjectured in the late 1970s. Researchers drawn to this problem began making connections to disparate topics in mathematics and physics including partition theory, symmetric functions, hypergeometric series, and statistical mechanics.The book is accessible to anyone with a knowledge of linear algebra. Students will learn what mathematicians actually do, and even researchers in combinatorics will find something new here.This is an introduction to recent developments in algebraic combinatorics and an illustration of how research in mathematics actually progresses. The author recounts the story of the search for and discovery of a proof of a counting formula conjectured in the late 1970s. Researchers drawn to this problem began making connections to disparate topics in mathematics and physics including partition theory, symmetric functions, hypergeometric series, and statistical mechanics.The book is accessible to anyone with a knowledge of linear algebra. Students will learn what mathematicians actually do, and even researchers in combinatorics will find something new here.This introduction to recent developments in algebraic combinatorics illustrates how research in mathematics actually progresses. The author recounts the dramatic search for and discovery of a proof of a counting formula conjectured in the late 1970s: the number of n x n alternating sign matrices, objects that generalize permutation matrices. While it was apparent that the conjecture must be true, the proof was elusive. As a result, researchers became drawn to this problem and made connections to aspects of the invariant tl"
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