Symmetric colorings of Hales-Jewett cubes coincide with one-weight colorings, reducing the symmetric lower-bound problem to 1D Gallai homothety coloring and yielding HJ(3,3)≥22 and HJ(4,2)≥14.
Improved algorithms for colorings of simple hypergraphs and applications
1 Pith paper cite this work. Polarity classification is still indexing.
abstract
The paper deals with extremal problems concerning colorings of hypergraphs. By using a random recoloring algorithm we show that any $n$-uniform simple (i.e. every two distinct edges share at most one vertex) hypergraph $H$ with maximum edge degree at most \[ \Delta(H)\leq c\cdot nr^{n-1}, \] is $r$-colorable, where $c>0$ is an absolute constant. %We prove also that similar result holds for $b$-simple hypergraphs. As an application of our proof technique we establish a new lower bound for Van der Waerden number $W(n,r)$, the minimum $N$ such that in any $r$-coloring of the set $\{1,...,N\}$ there exists a monochromatic arithmetic progression of length $n$. We show that \[ W(n,r)>c\cdot r^{n-1}, \] for some absolute constant $c>0$.
fields
math.CO 1years
2026 1verdicts
UNVERDICTED 1representative citing papers
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One-Weight Colorings, the Symmetric Class, and Lower Bounds for Hales--Jewett Numbers
Symmetric colorings of Hales-Jewett cubes coincide with one-weight colorings, reducing the symmetric lower-bound problem to 1D Gallai homothety coloring and yielding HJ(3,3)≥22 and HJ(4,2)≥14.