Simulating Polynomial-Time Nondeterministic Turing Machines via Nondeterministic Turing Machines

Abstract

We prove in this paper that there is a language Ls accepted by some nondeterministic Turing machine that runs within time O(nk) for any positive integer k∈N1 but not by any coNP machines. Then we further show that Ls is in NP, thus proving a groundbreaking result that NP≠ coNP. The main techniques used in this paper are simulation and the novel new techniques developed in the author's recent work. Our main result has profound implications, such as P≠NP, etc. Further, if there exists some oracle A such that PAA= coNPA, we then explore what mystery lies behind it and show that if PAA= coNPA and under some rational assumptions, then the set of all coNPA machines is not enumerable, thus showing that the simulation techniques are not applicable for the first half of the whole step to separate NPA from coNPA. Finally, a lower bounds result for Frege proof systems is presented (i.e., no Frege proof systems can be polynomially bounded).