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arxiv: 2210.07567 · v2 · pith:2FU3WA6Bnew · submitted 2022-10-14 · 🧮 math.CO

The e-positivity of the chromatic symmetric functions and the inverse Kostka matrix

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keywords symmetricchromaticfunctionsbouncedyckinversekostkamatrix
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We expand the chromatic symmetric functions for Dyck paths of bounce number three in the elementary symmetric function basis using a combinatorial interpretation of the inverse of the Kostka matrix studied in E\u{g}ecio\u{g}lu-Remmel (1990). We prove that certain coefficients in this expansion are positive. We establish the $e$-positivity of an extended class of chromatic symmetric functions for Dyck paths of bounce number three beyond the "hook-shape" case of Cho-Huh (2019).

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