Intuitionistic choice and classical logic

The effort in providing constructive and predicative meaning to non-constructive modes of reasoning has almost without exception been applied to theories with full classical logic [4]. In this paper we show how to combine unrestricted countable choice, induction on infinite well-founded trees and restricted classical logic in constructively given models. These models are sheaf models over a sigma-complete Boolean algebra, whose topologies are generated by finite or countable covering relations. By a judicious choice of the Boolean algebra we can directly extract effective content from Pi(2)(0)-statements true in the model. All the arguments of the present paper can be formalised in Martin-Lof's constructive type theory with generalised inductive definitions.