Generalizing Geometric Brownian Motion

Abstract

To convert standard Brownian motion Z into a positive process, Geometric Brownian motion (GBM) eβ Zt, β >0 is widely used. We generalize this positive process by introducing an asymmetry parameter α ≥ 0 which describes the instantaneous volatility whenever the process reaches a new low. For our new process, β is the instantaneous volatility as prices become arbitrarily high. Our generalization preserves the positivity, constant proportional drift, and tractability of GBM, while expressing the instantaneous volatility as a randomly weighted L2 mean of α and β. The running minimum and relative drawup of this process are also analytically tractable. Letting α = β, our positive process reduces to Geometric Brownian motion. By adding a jump to default to the new process, we introduce a non-negative martingale with the same tractabilities. Assuming a security's dynamics are driven by these processes in risk neutral measure, we price several derivatives including vanilla, barrier and lookback options.