# On the Nonexistence of Some Generalized Folkman Numbers

**Authors:** Xiaodong Xu, Meilian Liang, Stanis{\l}aw Radziszowski

arXiv: 1705.06268 · 2018-06-21

## TL;DR

This paper investigates the existence and nonexistence of certain generalized Folkman numbers, providing proofs for some cases and posing open problems for others, advancing understanding in graph Ramsey theory.

## Contribution

It establishes the well-definedness of specific edge and vertex Folkman numbers and proves the nonexistence of some, while proposing open problems for future research.

## Key findings

- Proved certain generalized Folkman numbers are well defined for k ≥ 3.
- Established nonexistence of specific Folkman numbers involving book graphs and other structures.
- Formulated open problems on the existence of particular edge Folkman numbers.

## Abstract

For an undirected simple graph $G$, we write $G \rightarrow (H_1, H_2)^v$ if and only if for every red-blue coloring of its vertices there exists a red $H_1$ or a blue $H_2$. The generalized vertex Folkman number $F_v(H_1, H_2; H)$ is defined as the smallest integer $n$ for which there exists an $H$-free graph $G$ of order $n$ such that $G \rightarrow (H_1, H_2)^v$. The generalized edge Folkman numbers $F_e(H_1, H_2; H)$ are defined similarly, when colorings of the edges are considered.   We show that $F_e(K_{k+1},K_{k+1};K_{k+2}-e)$ and $F_v(K_k,K_k;K_{k+1}-e)$ are well defined for $k \geq 3$. We prove the nonexistence of $F_e(K_3,K_3;H)$ for some $H$, in particular for $H=B_3$, where $B_k$ is the book graph of $k$ triangular pages, and for $H=K_1+P_4$. We pose three problems on generalized Folkman numbers, including the existence question of edge Folkman numbers $F_e(K_3, K_3; B_4)$, $F_e(K_3, K_3; K_1+C_4)$ and $F_e(K_3, K_3; \overline{P_2 \cup P_3} )$. Our results lead to some general inequalities involving two-color and multicolor Folkman numbers.

## Full text

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## References

17 references — full list in the complete paper: https://tomesphere.com/paper/1705.06268/full.md

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Source: https://tomesphere.com/paper/1705.06268