Veech's theorem of higher order
Abstract
For an abelian group G, g=(g1,…,gd)∈ Gd and ε=(ε(1),…,ε(d))∈ \0,1\d, let g· ε=Πi=1dgiε(i). In this paper, it is shown that for a minimal system (X,G) with G being abelian, (x,y)∈ RP[d] if and only if there exists a sequence \gn\n∈ N⊂eq Gd and points zε∈ X,ε∈ \0,1\d with z0=y such that for every ε∈ \0,1\d\ 0\, \[ n∞(gn·ε)x= zε and n∞(gn·ε)-1z1=z1-ε, \] where RP[d] is the regionally proximal relation of order d.
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