intertemporal CAPM

Within mathematical finance, the Intertemporal Capital Asset Pricing Model, or ICAPM, is an alternative to the CAPM provided by Robert Merton. It is a linear factor model with wealth as state variable that forecast changes in the distribution of future returns or income.

In the ICAPM investors are solving lifetime consumption decisions when faced with more than one uncertainty. The main difference between ICAPM and standard CAPM is the additional state variables that acknowledge the fact that investors hedge against shortfalls in consumption or against changes in the future investment opportunity set.

Continuous time version

Merton considers a continuous time market in equilibrium.
The state variable (X) follows a brownian motion:
:$dX = \mu dt + s dZ$
The investor maximizes his Von Neumann–Morgenstern utility:
:$E_o \left\$
where T is the time horizon and B (T),Tthe utility from wealth (W).

The investor has the following constraint on wealth (W).
Let $w_i$ be the weight invested in the asset i. Then:
: W(t+dt) = (t) -C(t) dtsum_^n w_i + r_i(t+ dt)
where $r_i$ is the return on asset i.
The change in wealth is:
: dW=-C(t)dt + (t)-C(t)dtsum 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:
:$\max E_0 \left\$
Then, a Taylor expansion gives:
: \int_t^U (s),ss= U (t),tt + \frac U_t (t^*),t^*t^2 \approx U (t),tt
where $t^*$ is a value between t and t+dt.

Assuming that returns follow a brownian motion:
:$r_i(t+dt) = \alpha_i dt + \sigma_i dz_i$
with:
:$E(r_i) = \alpha_i dt \quad ;\quad E(r_i^2)=var(r_i)=\sigma_i^2dt \quad ;\quad cov(r_i,r_j) = \sigma_dt$
Then canceling out terms of second and higher order:
: dW \approx (t) \sum w_i \alpha_i - C(t)t+W(t) \sum w_i \sigma_i dz_i

Using Bellman equation, we can restate the problem:
:$J(W,X,t) = max \; E_t\left\$
subject to the wealth constraint previously stated.

Using Ito's lemma we can rewrite:
: dJ = J (t+dt),X(t+dt),t+dtJ (t),X(t),t+dt J_t dt + J_W dW + J_X dX + \fracJ_ dX^2 + \fracJ_ dW^2 + J_ dX dW
and the expected value:
: E_t J (t+dt),X(t+dt),t+dtJ (t),X(t),tJ_t dt + J_W E W J_X E(dX) + \frac J_ var(dX)+\frac J_ var W+ J_ cov(dX,dW)
After some algebra:$E(dW)=-C(t)dt + W(t) \sum w_i(t) \alpha_i dt$
: var(dW) = (t)-C(t)dt2 var \sum w_i(t)r_i(t+dt) W(t)^2 \sum_ \sum_ w_i w_j \sigma_ dt
: \sum_^n w_i(t) \alpha_i = \sum_^n w_i(t) alpha_i - r_f+ r_f
, we have the following objective function:
:$max \left\$
where $r_f$ is the risk-free return.
First order conditions are:
:$J_W(\alpha_i-r_f)+J_W \sum_^n w^*_j \sigma_ + J_ \sigma_=0 \quad i=1,2,\ldots,n$
In matrix form, we have:
:$(\alpha - r_f ) = \frac \Omega w^* W + \frac cov_$
where $\alpha$ is the vector of expected returns, $\Omega$ the covariance matrix of returns, $$ a unity vector $cov_$ the covariance between returns and the state variable. The optimal weights are:
:$= \frac\Omega^(\alpha - r_f ) - \frac\Omega^ cov_$
Notice that the intertemporal model provides the same weights of the CAPM. Expected returns can be expressed as follows:
:$\alpha_i = r_f + \beta_ (\alpha_m - r_f) + \beta_(\alpha_h - r_f)$
where m is the market portfolio and h a portfolio to hedge the state variable.

See also

*Intertemporal portfolio choice

References

{{Reflist
* 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

Mathematical finance
Finance theories
Financial economics
Financial models