Merton^[1] considers a continuous time market in equilibrium. The state variable (X) follows a Brownian motion:

${\displaystyle dX=\mu dt+sdZ}$ 

The investor maximizes his Von Neumann–Morgenstern utility:

${\displaystyle E_{o}\left\{\int _{o}^{T}U[C(t),t]dt+B[W(T),T]\right\}}$ 

where T is the time horizon and B[W(T),T] the utility from wealth (W).

The investor has the following constraint on wealth (W). Let ${\displaystyle w_{i}}$  be the weight invested in the asset i. Then:

${\displaystyle W(t+dt)=[W(t)-C(t)dt]\sum _{i=0}^{n}w_{i}[1+r_{i}(t+dt)]}$ 

where ${\displaystyle r_{i}}$  is the return on asset i. The change in wealth is:

${\displaystyle dW=-C(t)dt+[W(t)-C(t)dt]\sum w_{i}(t)r_{i}(t+dt)}$ 

We can use dynamic programming to solve the problem. For instance, if we consider a series of discrete time problems:

${\displaystyle \max E_{0}\left\{\sum _{t=0}^{T-dt}\int _{t}^{t+dt}U[C(s),s]ds+B[W(T),T]\right\}}$ 

Then, a Taylor expansion gives:

${\displaystyle \int _{t}^{t+dt}U[C(s),s]ds=U[C(t),t]dt+{\frac {1}{2}}U_{t}[C(t^{*}),t^{*}]dt^{2}\approx U[C(t),t]dt}$ 

where ${\displaystyle t^{*}}$  is a value between t and t+dt.

Assuming that returns follow a Brownian motion:

${\displaystyle r_{i}(t+dt)=\alpha _{i}dt+\sigma _{i}dz_{i}}$ 

with:

${\displaystyle E(r_{i})=\alpha _{i}dt\quad ;\quad E(r_{i}^{2})=var(r_{i})=\sigma _{i}^{2}dt\quad ;\quad cov(r_{i},r_{j})=\sigma _{ij}dt}$ 

Then canceling out terms of second and higher order:

${\displaystyle dW\approx [W(t)\sum w_{i}\alpha _{i}-C(t)]dt+W(t)\sum w_{i}\sigma _{i}dz_{i}}$ 

Using Bellman equation, we can restate the problem:

${\displaystyle J(W,X,t)=max\;E_{t}\left\{\int _{t}^{t+dt}U[C(s),s]ds+J[W(t+dt),X(t+dt),t+dt]\right\}}$ 

subject to the wealth constraint previously stated.

Using Ito's lemma we can rewrite:

${\displaystyle dJ=J[W(t+dt),X(t+dt),t+dt]-J[W(t),X(t),t+dt]=J_{t}dt+J_{W}dW+J_{X}dX+{\frac {1}{2}}J_{XX}dX^{2}+{\frac {1}{2}}J_{WW}dW^{2}+J_{WX}dXdW}$ 

and the expected value:

${\displaystyle E_{t}J[W(t+dt),X(t+dt),t+dt]=J[W(t),X(t),t]+J_{t}dt+J_{W}E[dW]+J_{X}E(dX)+{\frac {1}{2}}J_{XX}var(dX)+{\frac {1}{2}}J_{WW}var[dW]+J_{WX}cov(dX,dW)}$ 

After some algebra^[2] , we have the following objective function:

${\displaystyle max\left\{U(C,t)+J_{t}+J_{W}W[\sum _{i=1}^{n}w_{i}(\alpha _{i}-r_{f})+r_{f}]-J_{W}C+{\frac {W^{2}}{2}}J_{WW}\sum _{i=1}^{n}\sum _{j=1}^{n}w_{i}w_{j}\sigma _{ij}+J_{X}\mu +{\frac {1}{2}}J_{XX}s^{2}+J_{WX}W\sum _{i=1}^{n}w_{i}\sigma _{iX}\right\}}$ 

where ${\displaystyle r_{f}}$  is the risk-free return. First order conditions are:

${\displaystyle J_{W}(\alpha _{i}-r_{f})+J_{WW}W\sum _{j=1}^{n}w_{j}^{*}\sigma _{ij}+J_{WX}\sigma _{iX}=0\quad i=1,2,\ldots ,n}$ 

In matrix form, we have:

${\displaystyle (\alpha -r_{f}{\mathbf {1} })={\frac {-J_{WW}}{J_{W}}}\Omega w^{*}W+{\frac {-J_{WX}}{J_{W}}}cov_{rX}}$ 

where ${\displaystyle \alpha }$  is the vector of expected returns, ${\displaystyle \Omega }$  the covariance matrix of returns, ${\displaystyle {\mathbf {1} }}$  a unity vector ${\displaystyle cov_{rX}}$  the covariance between returns and the state variable. The optimal weights are:

${\displaystyle {\mathbf {w} ^{*}}={\frac {-J_{W}}{J_{WW}W}}\Omega ^{-1}(\alpha -r_{f}{\mathbf {1} })-{\frac {J_{WX}}{J_{WW}W}}\Omega ^{-1}cov_{rX}}$ 

Notice that the intertemporal model provides the same weights of the CAPM. Expected returns can be expressed as follows:

${\displaystyle \alpha _{i}=r_{f}+\beta _{im}(\alpha _{m}-r_{f})+\beta _{ih}(\alpha _{h}-r_{f})}$ 

where m is the market portfolio and h a portfolio to hedge the state variable.

• Intertemporal portfolio choice

• Merton, R.C., (1973), An Intertemporal Capital Asset Pricing Model. Econometrica 41, Vol. 41, No. 5. (Sep., 1973), pp. 867–887
• "Multifactor Portfolio Efficiency and Multifactor Asset Pricing" by Eugene F. Fama, (The Journal of Financial and Quantitative Analysis), Vol. 31, No. 4, Dec., 1996