A Hopf laboratory for symmetric functions

Baez J; Baker T H; Baker T H; Baker T H; Bertfried Fauser; Black G R E; Borcherds R E; Brouder C; Brouder C Fauser B Frabetti A Oeckl R; Brouder C Schmitt W; Dondi P H; Drinfeld V G; Fauser B; Fauser B; Fauser B; Fauser B; Fauser B; Fauser B; Fauser B; Grosshans F D Rota G C Stein J A; Hazewinkel M; Jarvis P D; Joyal A; King R C; King R C; King R C; Knutson D; Lefschetz S; Littlewood D E; Littlewood D E; Luque J-G Thibon J-Y; Macdonald I G; Milnor J W; Newell M J; P D Jarvis; Poirier S; Rota G-C; Rota G-C Stein J A; Rota G-C Stein J A; Scharf T; Sweedler E M; Thibon J-Y; Thibon J-Y; Wilf H; Yang M

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A Hopf laboratory for symmetric functions

Abstract

An analysis of symmetric function theory is given from the perspective of the underlying Hopf and bi-algebraic structures. These are presented explicitly in terms of standard symmetric function operations. Particular attention is focussed on Laplace pairing, Sweedler cohomology for 1- and 2-cochains, and twisted products (Rota cliffordizations) induced by branching operators in the symmetric function context. The latter are shown to include the algebras of symmetric functions of orthogonal and symplectic type. A commentary on related issues in the combinatorial approach to quantum field theory is given.Comment: 29 pages, LaTeX, uses amsmat

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