On the Significance of Parameters in the Choice and Collection Schemata in the 2nd Order Peano Arithmetic

We make use of generalized iterations of the Sacks forcing to define cardinal-preserving generic extensions of the constructible universe L in which the axioms of ZF hold and in addition either (1) the parameter-free countable axiom of choice AC ω * fails, or (2) AC ω * holds but the full countable axiom of choice AC ω fails in the domain of reals. In another generic extension of L , we define a set X ⊆ P ( ω ) , which is a model of the parameter-free part PA 2 * of the 2nd order Peano arithmetic PA 2 , in which CA ( Σ 2 1 ) (Comprehension for Σ 2 1 formulas with parameters) holds, yet an instance of Comprehension CA for a more complex formula fails. Treating the iterated Sacks forcing as a class forcing over L ω 1 , we infer the following consistency results as corollaries. If the 2nd order Peano arithmetic PA 2 is formally consistent then so are the theories: (1) PA 2 + ¬ AC ω * , (2) PA 2 + AC ω * + ¬ AC ω , (3) PA 2 * + CA ( Σ 2 1 ) + ¬ CA .