Countable strict reverse mathematics
Abstract
We investigate subsystems COMfcn, COMIfcn and PRAfcn of the elementary theory of functions ETF, the base theory for countable strict reverse mathematics. We show that inductions on any variable for unary, binary and ternary functions are pairwise equivalent over COMfcn. We prove that weakened primitive recursion axiom WPRA is equivalent to primitive recursion axiom PRA over COMIfcn. We show that permutation axiom and minimization axioms MIN1, MIN2, MIN3 are pairwise equivalent over PRAfcn. Thus, we present several equivalent axiomatizations of ETF.
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