On the two-colour Rado number for Σi=1m aixi=c
Abstract
Let a1,…,am be nonzero integers, c ∈ Z and r 2. The Rado number for the equation \[ Σi=1m aixi = c \] in r colours is the least positive integer N such that any r-colouring of the integers in the interval [1,N] admits a monochromatic solution to the given equation. We introduce the concept of t-distributability of sets of positive integers, and determine exact values whenever possible, and upper and lower bounds otherwise, for the Rado numbers when the set \a1,…,am-1\ is 2-distributable or 3-distributable, am=-1, and r=2. This generalizes previous works by several authors.
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