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Detachments of Amalgamated 3-uniform Hypergraphs : Factorization Consequences. (arXiv:1710.03847v1 [math.CO])

来源于:arXiv
A detachment of a hypergraph $\scr F$ is a hypergraph obtained from $\scr F$ by splitting some or all of its vertices into more than one vertex. Amalgamating a hypergraph $\scr G$ can be thought of as taking $\scr G$, partitioning its vertices, then for each element of the partition squashing the vertices to form a single vertex in the amalgamated hypergraph $\scr F$. In this paper we use Nash-Williams lemma on laminar families to prove a detachment theorem for amalgamated 3-uniform hypergraphs, which yields a substantial generalization of previous amalgamation theorems by Hilton, Rodger and Nash-Williams. To demonstrate the power of our detachment theorem, we show that the complete 3-uniform $n$-partite multi-hypergraph $\lambda K_{m_1,\ldots,m_n}^{3}$ can be expressed as the union $\scr G_1\cup \ldots \cup\scr G_k$ of $k$ edge-disjoint factors, where for $i=1,\ldots, k$, $\scr G_i$ is $r_i$-regular, if and only if (i) $m_i=m_j:=m$ for all $1\leq i,j\leq k$, (ii) $3$ divides $r_imn$ f 查看全文>>