Local Morphology of the Partition Graph

Abstract

For a fixed integer n, let Gn be the graph whose vertices are the partitions of n, with adjacency defined by a single elementary transfer of a cell in the Ferrers diagram. In a previous paper, the clique complex Kn = Cl(Gn) was studied from a global homotopy-theoretic point of view. This paper studies instead the local combinatorics of the graph Gn itself. For a partition λ=(s1m1,…,stmt), where s1>…>st>0, we describe the admissible transfers from λ in terms of its block structure. This yields a bipartite graph B(λ) obtained from Kt,t+1 by deleting two explicitly determined families of edges, corresponding to singleton support blocks and unit support gaps. We prove that the graph induced on the neighborhood of λ in Gn is isomorphic to the line graph L(B(λ)). As consequences, we obtain an explicit formula for the degree of λ, a classification of all cliques through λ, and a formula for the maximal dimension of a simplex of Kn containing λ. These local invariants are shown to depend only on an ordered binary datum associated with the support of λ. The results provide a local structural description of the partition graph and a combinatorial language for the study of larger-scale features of Gn.

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