A dynamical approach to nonhomogeneous spectra

Abstract

Let α>0 and 0<γ<1. Define gα,γ N0 by gα,γ(n)= nα +γ, where x is the largest integer less than or equal to x. The set gα,γ(N)=\gα,γ(n) n∈N\ is called the γ-nonhomogeneous spectrum of α. By extension, the functions gα,γ are referred to as spectra. In 1996, Bergelson, Hindman and Kra showed that the functions gα,γ preserve some largeness of subsets of N, that is, if a subset A of N is an IP-set, a central set, an IP*-set, or a central*-set, then gα,γ(A) is the corresponding object for all α>0 and 0<γ<1. In 2012, Hindman and Johnson extended this result to include several other notions of largeness: C-sets, J-sets, strongly central sets, and piecewise syndetic sets. We adopt a dynamical approach to this issue and build a correspondence between the preservation of spectra and the lift property of suspension. As an application, we give a unified proof of some known results and also obtain some new results.