CONE-CONSTRAINED CONTINUOUS-TIME MARKOWITZ PROBLEMS
成果类型:
Article
署名作者:
Czichowsky, Christoph; Schweizer, Martin
署名单位:
University of Vienna; Swiss Federal Institutes of Technology Domain; ETH Zurich; Swiss Finance Institute (SFI)
刊物名称:
ANNALS OF APPLIED PROBABILITY
ISSN/ISSBN:
1050-5164
DOI:
10.1214/12-AAP855
发表日期:
2013
页码:
764-810
关键词:
variance portfolio selection
EQUATIONS
摘要:
The Markowitz problem consists of finding, in a financial market, a self-financing trading strategy whose final wealth has maximal mean and minimal variance. We study this in continuous time in a general semimartingale model and under cone constraints: trading strategies must take values in a (possibly random and time-dependent) closed cone. We first prove existence of a solution for convex constraints by showing that the space of constrained terminal gains, which is a space of stochastic integrals, is closed in L-2. Then we use stochastic control methods to describe the local structure of the optimal strategy, as follows. The value process of a naturally associated constrained linear-quadratic optimal control problem is decomposed into a sum with two opportunity processes L-+/- appearing as coefficients. The martingale optimality principle translates into a drift condition for the semimartingale characteristics of L-+/- or equivalently into a coupled system of backward stochastic differential equations for L-+/-. We show how this can be used to both characterize and construct optimal strategies. Our results explain and generalize all the results available in the literature so far. Moreover, we even obtain new sharp results in the unconstrained case.