On Some Properties of Accessible Sets

Abstract

A set D ⊂eq N is called r-large if every r-coloring of N admits arbitrarily long monochromatic arithmetic progressions a,a+d,...,a+(k-1)d with gap d ∈ D. Closely related to largeness is accessibility; a set D ⊂eq N is called r-accessible if every r-coloring of N admits arbitrarily long monochromatic sequences x1,x2,...,xk with xi+1-xi ∈ D. It is known that if D ⊂eq N is 2-large, then the gaps between elements in D cannot grow exponentially. In this paper, we show that if D is 2-accessible, then the gaps between elements in D cannot grow much faster than exponentially. Additionally, we show that the notion of accessibility is equivalent to that of topological recurrence.

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