TY - JOUR
T1 - The effective theory of Borel equivalence relations
AU - Fokina, E.B.
AU - Friedman, S.-D.
AU - Törnquist, Asger Dag
PY - 2010/4/1
Y1 - 2010/4/1
N2 - The study of Borel equivalence relations under Borel reducibility has developed into an important area of descriptive set theory. The dichotomies of Silver [20] and Harrington, Kechris and Louveau [6] show that with respect to Borel reducibility, any Borel equivalence relation strictly above equality on ω is above equality on P (ω), the power set of ω, and any Borel equivalence relation strictly above equality on the reals is above equality modulo finite on P (ω). In this article we examine the effective content of these and related results by studying effectively Borel equivalence relations under effectively Borel reducibility. The resulting structure is complex, even for equivalence relations with finitely many equivalence classes. However use of Kleene's O as a parameter is sufficient to restore the picture from the noneffective setting. A key lemma is that of the existence of two effectively Borel sets of reals, neither of which contains the range of the other under any effectively Borel function; the proof of this result applies Barwise compactness to a deep theorem of Harrington (see [5,16]) establishing for any recursive ordinal α the existence of Π10 singletons whose α-jumps are Turing incomparable.
AB - The study of Borel equivalence relations under Borel reducibility has developed into an important area of descriptive set theory. The dichotomies of Silver [20] and Harrington, Kechris and Louveau [6] show that with respect to Borel reducibility, any Borel equivalence relation strictly above equality on ω is above equality on P (ω), the power set of ω, and any Borel equivalence relation strictly above equality on the reals is above equality modulo finite on P (ω). In this article we examine the effective content of these and related results by studying effectively Borel equivalence relations under effectively Borel reducibility. The resulting structure is complex, even for equivalence relations with finitely many equivalence classes. However use of Kleene's O as a parameter is sufficient to restore the picture from the noneffective setting. A key lemma is that of the existence of two effectively Borel sets of reals, neither of which contains the range of the other under any effectively Borel function; the proof of this result applies Barwise compactness to a deep theorem of Harrington (see [5,16]) establishing for any recursive ordinal α the existence of Π10 singletons whose α-jumps are Turing incomparable.
UR - http://www.scopus.com/inward/record.url?scp=77649273539&partnerID=8YFLogxK
U2 - 10.1016/j.apal.2009.10.002
DO - 10.1016/j.apal.2009.10.002
M3 - Journal article
AN - SCOPUS:77649273539
SN - 0168-0072
VL - 161
SP - 837
EP - 850
JO - Annals of Pure and Applied Logic
JF - Annals of Pure and Applied Logic
IS - 7
ER -