TITLE:
Pricing of Margrabe Options for Large Investors with Application to Asset-Liability Management in Life Insurance
AUTHORS:
Erik Bølviken, Frank Proske, Mark Rubtsov
KEYWORDS:
Margrabe Option; Large Investor; Finite Differences Method
JOURNAL NAME:
Journal of Mathematical Finance,
Vol.4 No.2,
February
27,
2014
ABSTRACT:
We study a problem related to asset-liability management in life insurance. As shown by Wüthrich, Bühlmann and Furrer in [1], an insurance company can guarantee solvency by purchasing a Margrabe option enabling it to exchange its asset portfolio for a valuation portfolio. The latter can be viewed as a replicating portfolio for the insurance liabilities in terms of financial instruments. Our objective in this paper is to investigate numerically a valuation technique for such an option in a situation when the insurance company is a “large” investor, implying that its trading decisions can affect asset prices. We view this situation through the framework employed in the Cvitanic and Ma’s 1996 paper [2] and use the method of finite differences to solve the resulting non-linear PDE. Our results show reliability of this numerical method. Also we find, similarly to other authors, that the option price for the large investor is higher than that for a Black-Scholes trader. This makes it particularly compelling for a large insurance company to purchase a Margrabe option at the Black-Scholes price.