1. (logarithmic felicity) Consider the following utility maximization of some consumer over time. Mr,( .1。[loge(t) e--dt...
6.Consider the following utility maximization of some consumer over time. Max "dt subject to a(0)a(T)-0 a(t)-w(t)x1+r(t)xa(t)-ct) where w(t) and r(t) are given paths of real wages and the real rate of return of the single asset and σ # 1 is a positive constant. The parameter c represents the minimum a(t)- w(t)x1+r(t)xa(t)-c(t), subsistence level of consumption. Compute the Euler equation.
2. (CES felicity) Consider the following utility maximization of some consumer over time. /or(e(t)/σ e-ptdt subject to k(0)-k(T)-0, Max a (r) =n(t)x 1+r (t) x a(t)-c(t). where w(t) and r(t) are given paths of real wages and the real rate of return of the single asset and σ 1 is a positive constant. Compute the Euler equation.
3. Stone-Geary felicity) Consider the following utility maximization of some consumer over time. cr(e(t)-c)사-l eMt subject to k(0)=k(T)=0, where w(t) and r(t) are given paths of real wages and the real rate of return of the single asset and σ ël is a positive constant. The parameter c represents the minimum subsistence level of consumption. Compute the Euler equation.
Problem 1 Consider the following two-period utility maximization problem. This utility function belongs to the CRRA (Constant Relative Risk Aversion) class of functions which can be thought of as generalized logarithmic functions. An agent lives for two periods and in both receives some positive income. subject to +6+1 4+1 = 3+1 + (1 + r) ar+1 where a > 0,13 € (0, 1) and r>-1. (a) Rewrite the budget constraints into a single lifetime budget constraint and set up the...