✍ Scribed by Massimo Costabile; Ivar Massabó; Emilio Russo
No coin nor oath required. For personal study only.
📜 SIMILAR VOLUMES
This article develops a flexible binomial model with a "tilt" parameter that alters the shape and span of the binomial tree. A positive tilt parameter shifts the tree upward while a negative tilt parameter does exactly the opposite. This simple extension of the standard binomial model is shown to co
In this work we analyze the value of an Asian arithmetic option with an approach different from that used by Geman and Yor with Bessel processes in 1993. We obtain the same solution of the valuation problem, without using any previous results based on Bessel processes; by means of partial differenti
## Abstract This article revisits the topic of two‐state option pricing. It examines the models developed by Cox, Ross, and Rubinstein (1979), Rendleman and Bartter (1979), and Trigeorgis (1991) and presents two alternative binomial models based on the continuous‐time and discrete‐time geometric Br
This article generalizes the seminal Cox-Ross- binomial option pricing model to all members of the class of transformed-binomial pricing processes. The investigation addresses issues related with asset pricing modeling, hedging strategies, and option pricing. Formulas are derived for (a) replicatin