A Hopf algebra generalization of the symmetric functions in partially commutative variables
Abstract
The quasisymmetric functions, QSym, are generalized for a finite alphabet A by the colored quasisymmetric functions, QSymA, in partially commutative variables. Their dual, NSymA, generalizes the noncommutative symmetric functions, NSym, through a relationship with a Hopf algebra of trees. We define an algebra SymA, contained within QSymA, that is isomorphic to the symmetric functions, Sym, when A is an alphabet of size one. We show that SymA is a Hopf algebra and define its graded dual, PSymA, which is the commutative image of NSymA and also generalizes Sym. The seven algebras listed here can be placed in a commutative diagram connected by Hopf morphisms. In addition to defining generalizations of the classic bases of the symmetric functions to SymA and PSymA, we describe multiplication, comultiplication, and the antipode in terms of a basis for both algebras. We conclude by defining a pair of dual bases that generalize the Schur functions and listing open questions.
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