First- and Second-Order Models of Recursive Arithmetics

Abstract

We study a quadruple of interrelated subexponential subsystems of arithmetic WKL0-, RCA-0, I0, and 1, which complement the similarly related quadruple WKL0, RCA0, I1, and PRA studied by Simpson, and the quadruple WKL0, RCA0, I0(exp), and EFA studied by Simpson and Smith. We then explore the space of subexponential arithmetic theories between I0 and I0(exp). We introduce and study first- and second-order theories of recursive arithmetic ARA1 and ARA2 capable of characterizing various computational complexity classes and based on function algebras A, studied by Clote and others.