2-COLOR RADO NUMBER FOR x(1)
- Authors
- Kim, Byeong Moon; Hwang, Woonjae; Song, Byung Chul
- Issue Date
- 2020
- Publisher
- KANGWON-KYUNGKI MATHEMATICAL SOC
- Keywords
- Rado number; Schur number; Ramsey theory; r-coloring
- Citation
- KOREAN JOURNAL OF MATHEMATICS, v.28, no.2, pp.379 - 389
- Indexed
- KCI
- Journal Title
- KOREAN JOURNAL OF MATHEMATICS
- Volume
- 28
- Number
- 2
- Start Page
- 379
- End Page
- 389
- URI
- https://scholar.korea.ac.kr/handle/2021.sw.korea/59116
- DOI
- 10.11568/kjm.2020.28.2.379
- ISSN
- 1976-8605
- Abstract
- An r-color Rado number N = R(L, r) for a system L of equations is the least integer, provided it exists, such that for every r-coloring of the set {1, 2, ... , N}, there is a monochromatic solution to L. In this paper, we study the 2-color Rado number R(epsilon, 2) for x(1) + x(2) + ... + x(n) = y(1) + y(2) = z when n >= 4.
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Collections - College of Science and Technology > Data Computational Sciences in Division of Applied Mathematical Sciences > 1. Journal Articles
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