Star-Shaped Integral Cartan-Type Matrices and an Egyptian-Fraction Classification of Affine Weighted Trees

Abstract

We study a concrete family of symmetric integral Z-matrices attached to weighted star trees. The arms are ordinary type-A chains and the central diagonal entry is an arbitrary positive integer k rather than being fixed to the Cartan value 2. This gives a matrix-theoretic and graph-theoretic version of the so called Berger construction: it extends the simply laced affine Dynkin stars while remaining accessible through elementary linear algebra. For a star with arm lengths r1,…,rm we compute the determinant, the inertia, the positive-definite and affine regimes, and the primitive positive null vector in the affine case. The affine condition is exactly the unit-fraction equation \[ Σi=1m 1ri+1=m-k, \] so the classification of these affine weighted trees reduces to a finite Egyptian-fraction enumeration for each fixed pair (m,k). The classical affine diagrams D4(1), E6(1), E7(1) and E8(1) appear as small subfamilies, while higher-arm cases give new integral positive-semidefinite star matrices with explicit Coxeter labels.