What question did this study set out to answer?

The aim is to determine the chromatic index for locally irregular edge-coloring in claw-free graphs with a specified maximum degree.

April 7, 2026Open Access

Locally irregular edge-coloring of claw-free graphs with maximum degree 4

Puntos clave

The aim is to determine the chromatic index for locally irregular edge-coloring in claw-free graphs with a specified maximum degree.
Analysis of claw-free graphs with a maximum degree of 4
Definition and properties of locally irregular edge-coloring
Mathematical proofs to establish the upper limit of chromatic index
The locally irregular chromatic index χ i r r ′ ( G ) is shown to be less than or equal to 5 for specified graphs
Confirmed that claw-free graphs with a maximum degree of 4 admit this edge-coloring technique

Resumen

A graph is locally irregular if no two adjacent vertices have the same degree. A locally irregular edge-coloring of a graph G is such an (improper) edge-coloring that the edges of any fixed color induce a locally irregular subgraph. A decomposable graph G is any graph which admits a locally irregular edge-coloring. The locally irregular chromatic index χ i r r ′ ( G ) of a decomposable graph G is the smallest number of colors required by a locally irregular edge-coloring of G . In this paper, we establish that χ i r r ′ ( G ) ≤ 5 for all claw-free graphs with maximum degree 4.

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