Let v equal a vector of f set of polynomial functions. The fundamental theorem of algebra is the origin. So as the number of v and f approach positive infinity the total v solutions become accordingly complex. P VS NP states that P polynomial functions are always determined and that NP polynomial functions are irrecursible and not determined. However game theory requires an optimal solution set in any case. Game theory is applicable to any problem as optimization of linear algebra. Therefore P does not equal NP.