Shifted Quasi-Symmetric Functions and the Hopf algebra of peak functions Institutional Repository Document uri icon

abstract

  • In his work on P-partitions, Stembridge defined the algebra of peak functions Pi, which is both a subalgebra and a retraction of the algebra of quasi-symmetric functions. We show that Pi is closed under coproduct, and therefore a Hopf algebra, and describe the kernel of the retraction. Billey and Haiman, in their work on Schubert polynomials, also defined a new class of quasi-symmetric functions --- shifted quasi-symmetric functions --- and we show that Pi is strictly contained in the linear span Xi of shifted quasi-symmetric functions. We show that Xi is a coalgebra, and compute the rank of the n-th graded component.

author list (cited authors)

  • Bergeron, N., Mykytiuk, S., Sottile, F., & van Willigenburg, S.

complete list of authors

  • Bergeron, Nantel||Mykytiuk, Stefan||Sottile, Frank||van Willigenburg, Stephanie

Book Title

  • arXiv

publication date

  • April 1999