Flagged $(\mathcal{P},\rho)$-partitions
Sami Assaf, Nantel Bergeron

TL;DR
This paper develops the theory of flagged $( ext{P}, ho)$-partitions, demonstrating their generating functions form a basis related to slide polynomials, and proves positivity results for related functions.
Contribution
It introduces flagged $( ext{P}, ho)$-partitions, connecting their generating functions to the fundamental slide basis and proving their positivity properties.
Findings
Generated functions form a basis of polynomials.
Any flagged $( ext{P}, ho)$-partition generating function is a positive combination of slide polynomials.
Proved positivity of slide products and flagged Schur functions.
Abstract
We introduce the theory of -partitions, depending on a poset and a map from to positive integers. The generating function of -partitions is a polynomial that, when the images of tend to infinity, tends to Stanley's generating function of -partitions. Analogous to Stanley's fundamental theorem for -partitions, we show that the set of -partitions decomposes as a disjoint union of -partitions where runs over the set of linear extensions of . In this more general context, the set of all for linear orders over determines a basis of polynomials. We thus introduce the notion of flagged -partitions, and…
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