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    The second-order theories V^i characterize the levels of ... — Carmelics
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    Supports→A function f(x) is in FP if and only if it is definable by a Σ^B₁-formula relative to which it is provably total in V¹

    The second-order theories V^i characterize the levels of the Polynomial Hierarchy

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    A function f(x) is in FP if and only if it is definable by a Σ^B₁-formula relati...Σ^B₁-definability in V¹ captures exactly the polynomial-time computable function...

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    The second-order theories V^i introduced by Zambella (1996) characteri...87%The LST-number of second-order logic is the Löwenheim–Skolem–Tarski nu...75%Higher-level theories are legitimately reduced to lower-level theories...74%Reductionism requires that higher-level properties be fully specifiabl...74%

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    On the other hand, such indirect reference to polynomial rates of growth is avoided in similar functional characterizations of \(\textbf{FP}\) due to Leivant (1994) (using a form of positive second-order definability over strings) and Bellantoni and Cook (1992) (using a structural modification of the traditional primitive recursion scheme). Direct reference to polynomial rates of growth is also avoided in the formulation of the first-order arithmetical theory now known as \(\text{I}\Delta_0\) (w

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