Information in stock prices and some consequences: A model-free approach

Abstract

The price of a stock will rarely follow the assumed model and a curious investor or a Regulatory Authority may wish to obtain a probability model the prices support. A risk neutral probability P* for the stock's price at time T is determined in closed form from the prices before T without assuming a price model. The findings indicate that P* may be a mixture. Under mild conditions on the prices the necessary and sufficient condition to obtain P* is the coincidence at T of the stock price ranges assumed by the stock's trader and buyer. This result clarifies the relation between market's informational efficiency and the arbitrage-free option pricing methodology. It also shows that in an incomplete market there are risk neutral probabilities not supported by each stock and their use can be limited. P*-price C for the stock's European call option expiring at T is obtained. Among other results it is shown for "calm" prices, like the log-normal, that i) C is the Black-Scholes-Merton price thus confirming its validity for various stock prices, ii) the buyer's price carries an exponentially increasing volatility premium and its difference with C provides a measure of the market risk premium.