New Bounds on Diffsequences
Abstract
For a set of positive integers D, a k-term D-diffsequence is a sequence of positive integers a1<a2<·s<ak such that ai-ai-1∈ D for i=2,3,·s,k. For k∈Z+ and D⊂ Z+, we define (D,k), if it exists, to be the smallest integer n such that every 2-coloring of \1,2,·s,n\ contains a monochromatic D-diffsequence of length k. We improve the lower bound on (D,k) where D=\2i i∈Z≥0\, proving a conjecture of Chokshi, Clifton, Landman, and Sawin. We also determine all sets of the form D=\d1,d2,…\ with di di+1 for which (D,k) exists.
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