English

Multicolor $K_r$-Tilings with High Discrepancy

Combinatorics 2026-04-01 v1

Abstract

We study the minimum degree threshold δr,q\delta_{r,q} guaranteeing the existence of KrK_r-tilings of high discrepancy in any qq-edge-coloring. Balogh, Csaba, Pluh\'ar and Treglown handled the 2-color case, proving that δr,2=rr+1\delta_{r,2} = \frac{r}{r+1} for all r3r \geq 3. Here we determine δr,q\delta_{r,q} for all qq large enough, namely q(r2)q \geq \binom{r}{2}. For example, we show that for r4r \geq 4, δr,q=rr+1\delta_{r,q} = \frac{r}{r+1} for (r2)q(r+12)\binom{r}{2} \leq q \leq \binom{r+1}{2} and δr,q=r1r\delta_{r,q} = \frac{r-1}{r} for q(r+12)+2q \geq \binom{r+1}{2}+2. Thus, δr,q\delta_{r,q} has a phase transition at q=(r+12)q = \binom{r+1}{2}, where it drops from rr+1\frac{r}{r+1} and then stabilizes at the existence threshold r1r\frac{r-1}{r}. We also show that δr,qrr+1\delta_{r,q} \leq \frac{r}{r+1} for all r,qr,q, supplementing and giving a new proof for the result of Balogh, Csaba, Pluh\'ar and Treglown.

Keywords

Cite

@article{arxiv.2603.29277,
  title  = {Multicolor $K_r$-Tilings with High Discrepancy},
  author = {Henry Chan and Daniel Cheng and Lior Gishboliner and Xiangyu Li},
  journal= {arXiv preprint arXiv:2603.29277},
  year   = {2026}
}
R2 v1 2026-07-01T11:45:31.434Z