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arxiv: 1705.10067 · v2 · pith:TQGDDT4Bnew · submitted 2017-05-29 · 🧮 math.CO

On a generalized crank for k-colored partitions

classification 🧮 math.CO
keywords crankcoloredgeneralizedpartitionsandrews-lewisconcludecountsdefined
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A generalized crank ($k$-crank) for $k$-colored partitions is introduced. Following the work of Andrews-Lewis and Ji-Zhao, we derive two results for this newly defined $k$-crank. Namely, we first obtain some inequalities between the $k$-crank counts $M_{k}(r,m,n)$ for $m=2,3$ and $4$, then we prove the positivity of symmetrized even $k$-crank moments weighted by the parity for $k=2$ and $3$. We conclude with several remarks on furthering the study initiated here.

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