Constant elasticity of variance model

The CEV model describes a process which evolves according to the following stochastic differential equation:

${\displaystyle \mathrm {d} S_{t}=\mu S_{t}\mathrm {d} t+\sigma S_{t}^{\gamma }\mathrm {d} W_{t}}$

in which S is the spot price, t is time, and μ is a parameter characterising the drift, σ and γ are other parameters, and W is a Brownian motion.[2] The notation "dX" represents a differential, i.e. an infinitesimally small change in parameter X.

The constant parameters ${\displaystyle \sigma ,\;\gamma }$ satisfy the conditions ${\displaystyle \sigma \geq 0,\;\gamma \geq 0}$.

The parameter ${\displaystyle \gamma }$ controls the relationship between volatility and price, and is the central feature of the model. When ${\displaystyle \gamma <1}$ we see the so-called leverage effect, commonly observed in equity markets, where the volatility of a stock increases as its price falls. Conversely, in commodity markets, we often observe ${\displaystyle \gamma >1}$, the so-called inverse leverage effect,[3][4] whereby the volatility of the price of a commodity tends to increase as its price increases.

• Volatility (finance)
• Stochastic volatility
• SABR volatility model

• Asymptotic Approximations to CEV and SABR Models
• Price and implied volatility under CEV model with closed formulas, Monte-Carlo and Finite Difference Method
• Price and implied volatility of European options in CEV Model delamotte-b.fr