A General Framework for Studying Finite Rainbow Configurations-Reference-Cited by-同舟云学术

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A General Framework for Studying Finite Rainbow Configurations

Published:2019-12-11 Issue: Volume: Page:55-63
ISSN:2194-1009
Container-title:Combinatorial and Additive Number Theory III
language:
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Author:

Desgrottes Mike,Senger Steven,Soukup David,Zhu Renjun

Publisher

Springer International Publishing

Link

http://link.springer.com/content/pdf/10.1007/978-3-030-31106-3_5

Reference14 articles.

1. M. Axenovich and D. Fon-Der-Flaass (2004) On rainbow arithmetic progressions. Elec. J. Comb., 11:R1.

2. L. Babai (1985) An anti-Ramsey theorem. Graphs Combin. 1, 23–28.

3. M. Bennett, A. Iosevich, and J. Pakianathan (2014) Three-point configurations determined by subsets of $$\mathbb{F}_q^2$$ via the Elekes-Sharir paradigm. Combinatorica 34, no. 6, 689–706.

4. D. Hart, A. Iosevich, D. Koh, S. Senger, I. Uriarte-Tuero (2012) Distance graphs in vector spaces over finite fields. Bilyk, Dmitriy, et al., eds. Recent Advances in Harmonic Analysis and Applications: In Honor of Konstantin Oskolkov. Vol. 25. Springer Science & Business Media.

5. B. Green and T. Sanders (2016) Monochromatic sums and products. Discrete Analysis, pages 1–43, 2016:5.

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