A nonasymptotic lower time bound for a strictly bounded second-order arithmetic

Annals of Pure and Applied Logic 141 (3):320-324 (2006)
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Abstract

We obtain a nonasymptotic lower time bound for deciding sentences of bounded second-order arithmetic with respect to a form of the random access machine with stored programs. More precisely, let P be an arbitrary program for the model under consideration which recognized true formulas with a given range of parameters. Let p be the length of P and let N be an arbitrary natural number. We show how to construct a formula G with one free variable with length not more than 400 symbols and a value f of x such that the time required by P to decide the truth of G is at least N+1 steps. Furthermore, the G constructed does not depend on P and the length of f is less than p+400

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10.1016/j.apal.2005.12.009

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