Quasisymmetric functions and Heisenberg doubles

Yıl 2016, , 195 - 200, 09.08.2016

Jie Sun

https://doi.org/10.13069/jacodesmath.27877

Öz

The ring of quasisymmetric functions is free over the ring of symmetric functions. This result was
previously proved by M. Hazewinkel combinatorially through constructing a polynomial basis for
quasisymmetric functions. The recent work by A. Savage and O. Yacobi on representation theory
provides a new proof to this result. In this paper, we proved that under certain conditions, the
positive part of a Heisenberg double is free over the positive part of the corresponding projective
Heisenberg double. Examples satisfying the above conditions are discussed.

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