JSTOR is a not-for-profit service that helps scholars, researchers, and students discover, use, and build upon a wide range of content in a trusted digital archive. We use information technology and tools to increase productivity and facilitate new forms of scholarship. For more information about JSTOR, please contact support@jstor.org.. Wiley and American Finance Association are collaborating with JSTOR to digitize, preserve and extend access IT IS WELL KNOWN that the valuation of European puts and calls with fixed exercise prices is solely dependent on the distribution of the terminal price of the underlying stock. This paper examines the properties of European options with exercise prices that are functions of the realized sample path of the stock. In particular, the commonplace shareholder desire to "buy at the low" and sell at the high" can be satisfied with a combination of a call on the stock with an exercise price equal to mino.T S(r) and a put with exercise price equal to maxo,TS(T)where S is the stock price and T is the term of the option.'Strictly speaking, the creation of these new options in a frictionless context would not expand the investor's opportunity set. However, in a realistic market setting such new options might very well acquire substantial popularity. The appeal would be threefold: (1) the options would guarantee the investor's fantasy of buying at the low and selling at the high, (2) the options would, in some loose intuitive sense, minimize regret, and (3) the options would allow investors with special information on the range (but possibly without special information on the terminal stock price) to directly take advantage of such information.In this paper we analyze the hedging, pricing, and economic properties of these options. Wherever possible we compare and contrast these options with their traditional counterparts. In section two we establish that these options can be hedged and that closed-form valuation equations exist. Particular emphasis here centers on the hedgeability of these options when the stock is at an extremum (i.e., equal to its current maximum or minimum). In section three, by analysis and simulation, we establish the properties of these options and contrast them with those of their traditional counterparts. In particular we examine: (1) the functional dependence of these options with respect to two state variables-stock price and time to expiration, and (2) the pricing of these options relative to the stock and traditional options at the time of inception. Due to the ungainliness of the general pricing relations developed in section two, we found it convenient throughout section three to provide detailed analyses and explicit derivations of the properties of these options for the particularly intuitive case where the logarithm of the adjusted geometric mean return of the stock is zero. We then illustrate by simulation that, qualitatively, the results of our specific example carry over to the general case. We conclude in section four with a general discussion of pa...
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