On rainbow solutions to an equation with a quadratic term.

Zhan, Tong

Displaying similar documents to “On rainbow solutions to an equation with a quadratic term.”

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A multiplicity problem related to Schur numbers.

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Rainbow 3-term arithmetic progressions.

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Some new exact van der Waerden numbers.

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On the degree of regularity of generalized van der Waerden triples.

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Disjunctive Rado numbers for $x_{1} + x_{2} + c = x_{3}$ .

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On rainbow arithmetic progressions.

Axenovich, Maria, Fon-Der-Flaass, Dmitri (2004)

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Two color off-diagonal Rado-type numbers.

Myers, Kellen, Robertson, Aaron (2007)

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On monochromatic subsets of a rectangular grid.

Axenovich, Maria, Manske, Jacob (2008)

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Generalized Schur numbers for $x_{1} + x_{2} + c = 3 x_{3}$ .

Kézdy, André E., Snevily, Hunter S., White, Susan C. (2009)

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A van der Waerden variant.

Compton, Kevin J. (1999)

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Rainbow Ramsey theorems for colorings establishing negative partition relations

András Hajnal (2008)

Fundamenta Mathematicae

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Given a function f, a subset of its domain is a rainbow subset for f if f is one-to-one on it. We start with an old Erdős problem: Assume f is a coloring of the pairs of ω₁ with three colors such that every subset A of ω₁ of size ω₁ contains a pair of each color. Does there exist a rainbow triangle? We investigate rainbow problems and results of this style for colorings of pairs establishing negative "square bracket" relations.

Monochromatic and zero-sum sets of nondecreasing modified diameter.

Grynkiewicz, David, Sabar, Rasheed (2006)

The Electronic Journal of Combinatorics [electronic only]

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An improvement to Mathon's cyclotomic Ramsey colorings.

Xu, Xiaodong, Radziszowski, Stanislaw P. (2009)

The Electronic Journal of Combinatorics [electronic only]

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