Arnold, Crack and Schwartz (ACS) (2010) generalize the Rubinstein (1994) risk-neutral implied binomial tree (R-IBT) model by introducing a risk premium. Their new risk-averse implied binomial tree model (RA-IBT) has both probabilistic and pricing applications. They use the RA-IBT model to...

Financial statements and an accompanying NPV calculation are embedded into a binomial tree. This generalization of traditional static NPV analysis allows the financial statements to both evolve through time and, at any given time, to vary with states of the world (similar to a Monte Carlo...

Arnold, Crack and Schwartz (2010) generalize the Rubinstein (1994) risk-neutral implied binomial tree (R-IBT) model by introducing a risk premium. Their new risk-averse implied binomial tree model (RA-IBT) has both probabilistic and pricing applications. They use the RA-IBT model to estimate the...

We give a simple pragmatic justification for risk neutral pricing that can be presented in a classroom without the explicit use of any advanced mathematics. We do this by exploiting a generalized binomial option pricing model developed by Arnold and Crack [2000]. This model allows for a...

A real option on a commodity is valued using an implied binomial tree (IBT) calibrated using commodity futures options prices. Estimating an IBT in the absence of spot options (the norm for commodities) allows real option models to be calibrated for the first time to market-implied probability...