The following pages link to A note on list-colorings (Q3828020):
Displaying 29 items.
- Some results on \((a:b)\)-choosability (Q1025484) (← links)
- List-colourings of graphs (Q1084403) (← links)
- The total chromatic number of nearly complete bipartite graphs (Q1179463) (← links)
- Colorings and orientations of graphs (Q1196681) (← links)
- Interval edge coloring of a graph with forbidden colors (Q1309462) (← links)
- List \(T\)-colorings of graphs (Q1309815) (← links)
- On the relations of various conjectures on Latin squares and straightening coefficients (Q1322185) (← links)
- Recent developments in total colouring (Q1322273) (← links)
- List edge and list total colourings of multigraphs (Q1366604) (← links)
- List colorings and reducibility (Q1372746) (← links)
- On the list coloring version of Reed's conjecture (Q1689939) (← links)
- Asymptotically the list colouring constants are 1 (Q1850621) (← links)
- On the Dinitz conjecture and related conjectures (Q1901032) (← links)
- A Hajós-like theorem for list coloring (Q1917503) (← links)
- Nonrepetitive list colorings of the integers (Q2033476) (← links)
- List supermodular coloring with shorter lists (Q2322511) (← links)
- List edge colourings of some 1-factorable multigraphs (Q2563511) (← links)
- List-colourings (Q2822593) (← links)
- On the problem of Erdős and Hajnal in the case of list colorings (Q2851493) (← links)
- On neighbour-distinguishing colourings from lists (Q3439452) (← links)
- List Colouring Constants of Triangle Free Graphs (Q3503542) (← links)
- The Dinitz problem solved for rectangles (Q4275683) (← links)
- Choice Numbers of Graphs: a Probabilistic Approach (Q4291205) (← links)
- (Q4386303) (← links)
- Near-optimal list colorings (Q4521554) (← links)
- Short Proof of Galvin's Theorem on the List-chromatic Index of a Bipartite Multigraph (Q4883064) (← links)
- Two Chromatic Conjectures: One for Vertices and One for Edges (Q5506782) (← links)
- COLORING ALGORITHMS ON SUBCUBIC GRAPHS (Q5696963) (← links)
- Amenable colorings (Q5906786) (← links)
