A previous article shows that any linear height bounded normal proof of a tautology in the Natural Deduction for Minimal implicational logic $M_{\supset}$ is as huge as it is redundant. More precisely, any proof in a family of super-polynomially sized and linearly height bounded proofs have a sub-derivation that occurs super-polynomially many times in it. In this article, we show that by collapsing all the repeated sub-derivations we obtain a smaller structure, a rooted Directed Acyclic Graph (r-DAG), that is polynomially upper-bounded on the size of $\alpha$ and it is a certificate that $\alpha$ is a tautology that can be verified in polynomial time. In other words, for every huge proof of a tautology in $M_{\supset}$, we obtain a succinct certificate for its validity. Moreover, we show an algorithm able to check this validity in polynomial time on the certificate's size. Comments on how the results in this article are related to a proof of the conjecture $NP=CoNP$ appears in conclusion.
翻译:前一篇文章显示,任何线性高度在最小隐含逻辑自然下引的自然隐含逻辑($M ⁇ supset}$M ⁇ supset}美元中以线性高度作为典型的典型证据都是多余的。更确切地说,在超球尺寸和线性高度的家族中,任何证据都具有子衰减作用,在其中出现多次超球状。在这个文章中,我们显示,通过粉碎所有重复的次衰变,我们得到了一个较小的结构,一个根的定向环球图(r-DAG),这个结构在$alpha$的大小上是多成性的,它是一份证明,即$alpha$是一种可在多球时间中验证的图象学。换句话说,对于每一份以$M ⁇ supupssupet} $,我们就获得一个精确的证书。此外,我们展示了一种算法,能够检查证书大小上多球状时间的这一有效性。关于这篇文章的结果如何与QNP=CU的结论有关。
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