Goldberg–Seymour conjecture

In graph theory, the Goldberg–Seymour conjecture states that^[1][2]

${\displaystyle {\mathrm{\chi }}^{\prime }G\le \max (1+\mathrm{\Delta }G,\mathrm{\Gamma }G)}$

where ${\displaystyle {\mathrm{\chi }}^{\prime }G}$ is the edge chromatic number of G and

${\displaystyle \mathrm{\Gamma }G=\underset{H\subset G}{\max }\frac{|E(H)|}{\lfloor \frac{1}{2}|V(H)|\rfloor }.}$

Note this above quantity is twice the arboricity of G. It is sometimes called the density of G.^[2]

Above G can be a multigraph (can have loops).

It is already known that for loopless G (but can have parallel edges):^[2][3]

${\displaystyle {\mathrm{\chi }}^{\prime }G\ge \max (\mathrm{\Delta }G,\lceil \mathrm{\Gamma }G\rceil ).}$

When does equality not hold? It does not hold for the Petersen graph. It is hard to find other examples. It is currently unknown whether there are any planar graphs for which equality does not hold.

This conjecture is named after Mark K. Goldberg of Rensselaer Polytechnic Institute^[4] and Paul Seymour of Princeton University, who arrived to it independently of Goldberg.^[3]

In 2019, an alleged proof was announced by Chen, Jing, and Zang in the paper.^[3] Part of their proof was to find a suitable generalization of Vizing's theorem (which says that for simple graphs ${\displaystyle {\mathrm{\chi }}^{\prime }G\le 1+\mathrm{\Delta }G}$) to multigraphs. In 2023, Jing^[5] announced a new proof with a polynomial-time edge coloring algorithm achieving the conjectured bound.

• Petersen graph#Coloring
• Fractional coloring
• Graph coloring

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