The P versus NP problem transcends pure mathematics, as it pertains to the fundamental nature of allcomputational processes. The disparity between polynomial time for verifying a given result and polynomialtime for its discovery has been debated for decades without any foreseeable resolution. It has been suggested thatcurrent mathematical frameworks lack the necessary instrumentation to provide a definitive proof for thisproblem. This work humbly proposes a conceptual framework to analyze this mystery. By integrating adelicgeometry, motivic theory, and Galois theory, the objective is to establish a structural constraint that accounts forP vs NP, providing a rationale for why binary computers are unable to exploit polynomial solutions for problemscharacterized by exponential or factorial complexity.
Rodolfo Moroz (Mon,) studied this question.