Let X be a semimartiangale and let $\Theta$ be the space of
all predictable X-integrable process $\vartheta$ such that
$\int\vartheta dX$ is in the space $\varsigma^2$ of semimartingales. We
consider the problem of approximating a given random variable $H\in L^2(P)$ by
the sum of a constant c and a stochastic integral $\int_0^T\vartheta_s
dX_s$, with respect to the $L^2(P)$-norm. This problem comes from financial
mathematics, where the optimal constant $V_0$ can be interpreted as an
approximation price for the contingent clam H. An elementary computation
yields $V_0$ as the expectation of H under the variance-optimal signed
$\Theta$-martingale measure $\tilda{P}$, and this leads us to study $\tilda{P}$
in more detail. In the case of finite discrete time, we explicitly construct
$\tilda{P}$ by backward recursion, and we show that $\tilda{P}$ is typically
not a probability, but only a signed measure. In a continuous-time framework,
the situation becomes rather different: we prove that $\tilda{P}$ is nonegative
is X has continuous paths and satisfies a very mild no-arbitrage
condition. As an application, we show how to obtain the optimal integrand
$\xi\in\Theta$ in feedback form with the help of a backward stochastic
differential equation.
@article{1042644714,
author = {Schweizer, Martin},
title = {Approximation pricing and the variance-optimal martingale
measure},
journal = {Ann. Probab.},
volume = {24},
number = {2},
year = {1996},
pages = { 206-236},
language = {en},
url = {http://dml.mathdoc.fr/item/1042644714}
}
Schweizer, Martin. Approximation pricing and the variance-optimal martingale
measure. Ann. Probab., Tome 24 (1996) no. 2, pp. 206-236. http://gdmltest.u-ga.fr/item/1042644714/