Trees with maximum $\sigma$-irregularity under a prescribed maximum degree 6
Abstract
The sigma-irregularity index measures the total degree imbalance along the edges of a graph. We study extremal problems for within the class of trees of fixed order and bounded maximum degree . Using a penalty-function framework combined with handshake identities and congruence arguments, we determine the exact maximum value of for every residue class of modulo , showing that the possible minimum values of the penalty function are and . For each case, we provide a complete characterization of all maximizing trees in terms of degree counts and edge multiplicities. In five of the six residue classes, all extremal trees contain only vertices of degrees and , while for an additional exceptional family arises involving vertices of degree . These results extend earlier work on sigma-irregularity for smaller degree bounds and illustrate the rapidly growing combinatorial complexity of the problem as the maximum degree increases.
Keywords
Cite
@article{arxiv.2602.01262,
title = {Trees with maximum $\sigma$-irregularity under a prescribed maximum degree 6},
author = {Milan Bašić},
journal= {arXiv preprint arXiv:2602.01262},
year = {2026}
}