The Partition Graph as a Growing Discrete Geometric Object

Abstract

For each positive integer n, let Gn be the graph of integer partitions of n, where two partitions are adjacent if one is obtained from the other by an elementary transfer of a cell in the Ferrers diagram, followed by reordering. Previous work has studied the global homotopy type of the clique complex Cl(Gn) and the local combinatorics of Gn at a fixed vertex. This paper initiates the study of Gn itself as a growing discrete geometric object. It introduces a structural language for the large-scale morphology of partition graphs, centered on the antenna vertices, main chain, boundary framework, self-conjugate axis, simplex layers, degree landscape, central region, and spine. Using local invariants from the companion local theory, it also defines canonical vertex layerings of Gn. A small computational atlas for 1 n 12 is included to illustrate how these structures emerge and interact. The paper is intended as a foundational and exploratory contribution, providing a vocabulary, a first structural picture, and a set of open directions for future quantitative and asymptotic work.

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