Gallai-Schur Triples and Related Problems
Abstract
Schur's Theorem states that, for any r ∈ Z+, there exists a minimum integer S(r) such that every r-coloring of \1,2,…,S(r)\ admits a monochromatic solution to x+y=z. Recently, Budden determined the related Gallai-Schur numbers; that is, he determined the minimum integer GS(r) such that every r-coloring of \1,2,…,GS(r)\ admits either a rainbow or monochromatic solution to x+y=z. In this article we consider problems that have been solved in the monochromatic setting under a monochromatic-rainbow paradigm. In particular, we investigate Gallai-Schur numbers when x ≠ y, we consider x+y+b=z and x+y<z, and we investigate the asymptotic minimum number of rainbow and monochromatic solutions to x+y=z and x+y<z.
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