Geodesic
Symmetric chain decompositions of products of posets with long chains
Stefan David1 ; Hunter Spink2 ; Marius Tiba3
1Trinity College, Cambridge University
2Harvard University
3Trinity Hall, Cambridge University
The electronic journal of combinatorics, Tome 25 (2018) no. 1
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We ask if there exists a symmetric chain decomposition of the cuboid $Q_k \times n$ such that no chain is taut, i.e. no chain has a subchain of the form $(a_1,\ldots, a_k,0)\prec \cdots\prec (a_1,\ldots,a_k,n-1)$. In this paper, we show this is true precisely when $k \ge 5$ and $n\ge 3$. This question arises naturally when considering products of symmetric chain decompositions which induce orthogonal chain decompositions — the existence of the decompositions provided in this paper unexpectedly resolves the most difficult case of previous work by the second author on almost orthogonal symmetric chain decompositions (2017), making progress on a conjecture of Shearer and Kleitman (1979). In general, we show that for a finite graded poset $P$, there exists a canonical bijection between symmetric chain decompositions of $P \times m$ and $P \times n$ for $m, n\ge rk(P) + 1$, that preserves the existence of taut chains. If $P$ has a unique maximal and minimal element, then we also produce a canonical $(rk(P) +1)$ to $1$ surjection from symmetric chain decompositions of $P \times (rk(P) + 1)$ to symmetric chain decompositions of $P \times rk(P)$ which sends decompositions with taut chains to decompositions with taut chains.
DOI : 10.37236/7124
Classification : 06A06, 06A07
Mots-clés : symmetric chain decompositions, posets, hypercubes

Stefan David  1   ; Hunter Spink  2   ; Marius Tiba  3

1 Trinity College, Cambridge University
2 Harvard University
3 Trinity Hall, Cambridge University 
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Stefan David; Hunter Spink; Marius Tiba. Symmetric chain decompositions of products of posets with long chains. The electronic journal of combinatorics, Tome 25 (2018) no. 1. doi: 10.37236/7124

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