In this paper conditions proposed in Flores-Hernández and Montes-de-Oca \cite{Flores} which permit to obtain monotone minimizers of unbounded optimization problems on Euclidean spaces are adapted in suitable versions to study noncooperative games on Euclidean spaces with noncompact sets of feasible joint strategies in order to obtain increasing optimal best responses for each player. Moreover, in this noncompact framework an algorithm to approximate the equilibrium points for noncooperative games is supplied.
We study the solutions and attractivity of the difference equation xn+1 = xn−3/(−1 + xnxn−1xn−2xn−3) for n = 0, 1, 2, . . . where x−3, x−2, x−1 and x0 are real numbers such that x0x−1x−2x−3 ≠ 1.