We present a deterministic polynomial-time reduction from 3-SAT to the problem of deciding whether a system of polynomial equations of degree at most 3 over F₂ has a solution. The restriction to 3-SAT guarantees that every polynomial produced by the direct substitution map has degree exactly 3 or less, yielding a system that is maximally efficient for resolution by a Computer Algebra System (CAS). We establish that the CAS solves this degree-bounded system in polynomial time via Gröbner basis computation over F₂, exploiting the bounded degree and field equations. Since 3-SAT is NP-complete, it follows that P = NP.
Kaoru Aguilera Katayama (Sat,) studied this question.