The Degree Landscape of the Partition Graph: Maximal Degree, Extremal Vertices, and Spectra
Abstract
We study the degree landscape of the partition graph Gn, whose vertices are the integer partitions of n and whose edges correspond to elementary transfers of one unit between parts, followed by reordering. Using the previously established local degree formula, we introduce the degree layers Dd(n), the degree spectrum SpecD(n), and the numerical invariants n, m(n), and s(n). The main theorem provides an exact formula for the maximal degree. If (n):=\r:Tr n\, Tr=r(r+1)2, and :=n-T(n), then n=(n)((n)-1)+β(n)(), where βr is an explicit budget function governed by a square--pronic threshold rule. We also prove that every maximal-degree vertex lies on the maximal-support stratum, and we obtain exact extremal classifications at the levels n=Tt, n=Tt+1, and n=Tt+2. The paper also includes a finite computation on the range 1 n 60, recording extremal multiplicities, representative extremal shapes, spectrum sizes, selected degree histograms, and first data on contact between the extremal layer and the self-conjugate axis. This computational part is deliberately limited in scope. It is descriptive rather than exhaustive, and is included only as a first numerical profile of the degree landscape.
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