Abstract
A graph G is edge-k-choosable if, for any assignment of lists L(e)of at least k colors to all edges e ∈ E(G), there exists a proper edge coloring such that the color of e belongs to L(e) for all e ∈ E(G). One of Vizing’s classic conjectures asserts that every graph is edge-(Δ + 1)-choosable. It is known since 1999 that this conjecture is true for general graphs with Δ ≤ 4. More recently, in 2015, Bonamy confirmed the conjecture for planar graph with Δ ≥ 8, but the conjecture is still open for planar graphs with 5 ≤ Δ ≤ 7. We confirm the conjecture for planar graphs with Δ ≥ 6 in which every 7-cycle (if any) induces a C7 (so, without chords), thereby extending a result due to Dong, Liu and Li.
| Original language | English |
|---|---|
| Pages (from-to) | 1037-1054 |
| Number of pages | 18 |
| Journal | Acta Mathematica Sinica, English Series |
| Volume | 41 |
| Issue number | 3 |
| DOIs | |
| State | Published - Mar 2025 |
Keywords
- 05B05
- 05B25
- 20B25
- Combinatorial Nullstellensatz
- discharging
- edge-k-choosability
- list edge coloring
- Planar graph