Here, we examine a mean-field game (MFG) that models the economic growth of a
population of non-cooperative rational agents. In this MFG, agents are
described by two state variables - the capital and consumer goods they own.
Each agent seeks to maximize their utility by taking into account statistical
data of the total population. The individual actions drive the evolution of the
players, and a market-clearing condition determines the relative price of
capital and consumer goods. We study the existence and uniqueness of optimal
strategies of the agents and develop numerical methods to compute these
strategies and the equilibrium price