An inverse of Furstenberg's correspondence principle and applications to nice recurrence
Abstract
We prove an inverse of Furstenberg's correspondence principle stating that for all measure preserving systems (X,μ,T) and A⊂ X measurable there exists a set E ⊂ N such that \[ μ( i=1k T-niA) = N ∞ |( i=1k (E-ni) ) \0,…,N-1\|N\] for all k,n1,…,nk ∈ N. As a corollary we show that a set R⊂ N is a set of nice recurrence if and only if it is nicely intersective. Together, the inverse of Furstenberg's correspondence principle and it's corollary partially answer two questions of Moreira.
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