Abstract
The immaculate functions, $\mathfrak{S}_{\alpha}$, were introduced as a Schur-like basis for $\operatorname{\mathsf{Nsym}}$. We investigate facts about their structure constants. These are analogues of Littlewood-Richardson coefficents. We will give a new proof of the left Pieri rule for the $\mathfrak{S}_{\alpha}$, a translation invariance property for the structure coefficients of the $\mathfrak{S}_{\alpha}$, and a counterexample to an $\mathfrak{S}_{\alpha}$-analogue of the saturation conjecture.
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