中文

Mean-variance Hedging Under Partial Information

概率论 2008-12-10 v1 最优化与控制 计算金融

摘要

We consider the mean-variance hedging problem under partial Information. The underlying asset price process follows a continuous semimartingale and strategies have to be constructed when only part of the information in the market is available. We show that the initial mean variance hedging problem is equivalent to a new mean variance hedging problem with an additional correction term, which is formulated in terms of observable processes. We prove that the value process of the reduced problem is a square trinomial with coefficients satisfying a triangle system of backward stochastic differential equations and the filtered wealth process of the optimal hedging strategy is characterized as a solution of a linear forward equation.

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引用

@article{arxiv.math/0703424,
  title  = {Mean-variance Hedging Under Partial Information},
  author = {M. Mania and R. Tevzadze and T. Toronjadze},
  journal= {arXiv preprint arXiv:math/0703424},
  year   = {2008}
}