What Is the Heston Model?

The Heston Model, named after Steve Heston, is a type of stochastic volatility model used to price European options.

Understanding the Heston Model

The Heston Model, developed by associate finance professor Steven Heston in 1993, is an option pricing model that can be used for pricing options on various securities. It is comparable to the more popular 澳洲幸运5官方开奖结果体彩网:Black-Scholes option pricing model.

Overall, option pricing models are used by advanced investors ওto estimate and gauge the price of a particul♔ar option, trading on an underlying security in the financial marketplace. Options, just like their underlying security, will have prices that change throughout the trading day. Option pricing models seek to analyze and integrate the variables that cause fluctuation of option prices in order to identify the best option price for investment.

As a 澳洲幸运5官方开奖结果体彩网:stochastic volatility model, the Heston Model uses statistical methods to calculate and forecast option pricing with the assumption that volatility is arbitrary. The assumption that volatility is arbitrary, rather than constant, is the key factor that makes stochastic volatility models unique. Other types of stochastic volatility models include the SABR model, the Chen model, and the GARCH model.

Key Differences

The Heston Model has characteristics that distinguish it from other stochasti🐟c volatility models, namely:

• It factors in a possible correlation between a stock's price and its volatility.
• It conveys volatility as reverting to the mean.
• It gives a closed-form solution, meaning that the answer is derived from an accepted set of mathematical operations.
• It does not require that stock prices follow a lognormal probability distribution.

The Heston Model is also a type of 澳洲幸运5官方开奖结果体彩网:volatility smile model. "Smile" refers to the volatility smile, a graphical representation of several options with identical expiration dates that show increasing volatility as the options become more 澳洲幸运5官方开奖结果体彩网:in-the-money (ITM) or 澳洲幸运5官方开奖结果体彩网:out-of-the-money (OTM). The smile model's name derives from✃ thꦏe concave shape of the graph, which resembles a smile.

Heston Model Methodology

The Heston Model is a closed-form solutᩚᩚᩚᩚᩚᩚ⁤⁤⁤⁤ᩚ⁤⁤⁤⁤ᩚ⁤⁤⁤⁤ᩚ𒀱ᩚᩚᩚion for pricing options that seeks to overcome some of the shortcomings presented in the Black-Scholes option pricing model. The Heston Model is a tool for advanced investors.

The calculation is as follows:

$\begin{aligned} &dS_t = rS_tdt + \sqrt{ V_t } S_tdW_{1t} \\ &dV_t = k ( \theta - V_t ) dt+ \sigma \sqrt{ V_t } dW_{2t} \\ &\textbf{where:} \\ &S_t = \text{asset price at time } t \\ &r = \text{risk-free interest rate -- theoretical rate on an} \\ &\text{asset carrying no risk} \\ &\sqrt{ V_t } = \text{volatility (standard deviation) of the asset price} \\ &\sigma = \text{volatility of the } \sqrt{ V_t } \\ &\theta = \text{long-term price variance} \\ &k = \text{rate of reversion to } \theta \\ &dt = \text{indefinitely small positive time increment} \\ &W_{1t} = \text{Brownian motion of the asset price} \\ &W_{2t} = \text{Brownian motion of the asset's price variance} \\ \end{aligned}$​dSt​=rSt​dt+Vt​​St​dW1t​dVt​=k(θ−Vt​)dt+σVt​​dW2t​where:St​=asset price at time tr=risk-free interest rate – theoretﷺical rate on anasset carrying no riskVt​​=volatility (standard deviation) of the asset&nbs🤪ꦬp;priceσ=volatility of the Vt​​θ=long-term price variancek=rate of reversion to θdt=indefinitely small positive&nbs👍p;time incrementW1t​=Brownian motion of the&🌊nbsp;asset priceW2t​=Brownian motion of the&nbs🌊p;asset’s price variance​

Heston Model vs. Black-Scholes

The Black-Scholes model for option pricing was introduced in the 1970s and served as one of the first models for helping investors derive a price associated with an option on a security. In general, it helped to promote option investing as it created a🐷 model for analyzing the price of options on various se🍨curities.

Both the Black-Scholes and Heston Model are based on underly✱ing calculations that can be coded and programmed through advanced Excel or other quantitative systems. The Black-Scholes call option formula is calculated by multiplying the stock price by the cumulative standard normalജ probability distribution function.

Thereafter, the 澳洲幸运5官方开奖结果体彩网:net present value (NPV) of the strike price multiplied by the cumulative standard normal dis🤡tribution is subtracted from the resulting value of the previous calculation.

In mathematical notation,

Call = S * N(d₁) – K_e^{(-r * T) * N(d}₂⁾

Conversely, the v🎀alue of a put option could be calculated using the formula:

Put = K_e^{(-r * T) * N(-d2)} – S * N(-d₁)

In both formulas, S is the stock price, K is the strike price, r is the risk-free interest rate, and T is the time to m♋aturity.

The formula for d₁ is:

(ln(S/K) + (r + (Annualized Volatility)²/2) * T)/(Annualized Volatility * (T^0.5))

The formula for d₂ is:

d1 – (Annualized Volatility) * (T^0.5)

Special Considerations

The Heston Model is noteworthy because it seeks to provide for one of the main limitations of the Black-Scཧholes model which holds volatility constant. The use of stochastic variables in the Heston Model provides for the notion ♛that volatility is not constant but arbitrary.

Both the basic Black-Scholes model and the Heston Model still only prov𒅌ide option pricing estimates for a European option, which is an option that can only be exercised on its expiration date. Various research and models have been studied for pricing American options through both Black-Scholes and the Heston Model. These variations provide estimates for options that can be exercised on any date leading up to the expiration date, as is the case for American options.