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London School of Economics and Political Science (LSE) Modules Mathematical economics [120]Note: this is a new unit expected to be examined for the first time in 2008. Prerequisites
(if taken as part of a BSc degree): Techniques of constrained optimisation. This is a rigorous treatment of the mathematical techniques used for solving constrained optimisation problems, which are basic tools of economic modelling. Topics include: Definitions of a feasible set and of a solution, sufficient conditions for the existence of a solution, maximum value function, shadow prices, Lagrangian and Kuhn Tucker necessity and sufficiency theorems with applications in economics, for example General Equilibrium theory, Arrow-Debreu securities and arbitrage. Intertemporal optimisation. Bellman approach. Euler equations. Stationary infinite horizon problems. Continuous time dynamic optimisation (optimal control). Applications, such as habit formation, Ramsey-Kass-Coopmans model, Tobin’s q, capital taxation in an open economy, are considered. Tools for optimal control: ordinary differential equations. These are studied in detail and include linear 2nd order equations, phase portraits, solving linear systems, steady states and their stability. |