On effective sigma-boundedness and sigma-compactness

Abstract

We prove several theorems on sigma-bounded and sigma-compact pointsets. We start with a known theorem by Kechris, saying that any lightface 11 set of the Baire space either is effectively sigma-bounded (that is, covered by a countable union of compact lightface 11 sets), or contains a superperfect subset (and then the set is not sigma-bounded, of course). We add different generalizations of this result, in particular, 1) such that the boundedness property involved includes covering by compact sets and equivalence classes of a given finite collection of lightface 11 equivalence relations, 2) generalizations to lightface 12 sets, 3) generalizations true in the Solovay model. As for effective sigma-compactness, we start with a theorem by Louveau, saying that any lightface 11 set of the Baire space either is effectively sigma-compact (that is, is equal to a countable union of compact lightface 11 sets), or it contains a relatively closed superperfect subset. Then we prove a generalization of this result to lightface 11 sets.