The zero blocking numbers of generalized Kneser graphs and generalized Johnson graphs

Hau-Yi Lin; Wu-Hsiung Lin; Gerard Jennhwa Chang

arXiv:2508.02125·math.CO·August 5, 2025

The zero blocking numbers of generalized Kneser graphs and generalized Johnson graphs

Hau-Yi Lin, Wu-Hsiung Lin, Gerard Jennhwa Chang

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TL;DR

This paper investigates the zero blocking numbers of generalized Kneser and Johnson graphs, extending previous results to broader classes of these combinatorial structures.

Contribution

It generalizes existing results on zero blocking numbers from Kneser and Johnson graphs to their generalized versions.

Findings

01

Extended zero blocking number bounds to generalized graphs

02

Provided new theoretical insights into graph blocking properties

03

Connected classical and generalized graph structures

Abstract

This paper extends the results by Afzali, Ghodrati and Maimani for the zero blocking numbers of Kneser graphs and Johnson graphs to generalized Kneser graphs and generalized Johnson graphs.

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Taxonomy

TopicsLimits and Structures in Graph Theory · Graph theory and applications · Stochastic processes and statistical mechanics