TY - UNPB
T1 - ⨁p∈PFp -Systems as Abramov Systems
AU - Shalom, Or
PY - 2020
Y1 - 2020
N2 - Let P be an (unbounded) countable multiset of primes, let G=⨁p∈PFp. We study the k'th universal characteristic factors of an ergodic probability system (X,B,μ) with respect to some measure preserving action of G. We find conditions under which every extension of these factors is generated by phase polynomials and we give an example of an ergodic G-system that is not Abramov. In particular we generalize the main results of Bergelson Tao and Ziegler who proved a similar theorem in the special case P={p,p,p,...} for some fixed prime p. In a subsequent paper we use this result to prove a general structure theorem for ergodic ⨁p∈PFp-systems.
AB - Let P be an (unbounded) countable multiset of primes, let G=⨁p∈PFp. We study the k'th universal characteristic factors of an ergodic probability system (X,B,μ) with respect to some measure preserving action of G. We find conditions under which every extension of these factors is generated by phase polynomials and we give an example of an ergodic G-system that is not Abramov. In particular we generalize the main results of Bergelson Tao and Ziegler who proved a similar theorem in the special case P={p,p,p,...} for some fixed prime p. In a subsequent paper we use this result to prove a general structure theorem for ergodic ⨁p∈PFp-systems.
U2 - 10.48550/arXiv.2006.06470
DO - 10.48550/arXiv.2006.06470
M3 - פרסום מוקדם
BT - ⨁p∈PFp -Systems as Abramov Systems
ER -