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| Bates-Modell× | Lokale Volatilität (Dupire)× | Risikoneutrale Bewertung× | |
|---|---|---|---|
| Fachgebiet | Quantitative Finanzwirtschaft | Quantitative Finanzwirtschaft | Quantitative Finanzwirtschaft |
| Familie | Regression model | Regression model | Regression model |
| Entstehungsjahr≠ | 1996 | 1994 | 1979 |
| Urheber≠ | David S. Bates | Bruno Dupire | John Harrison and David Kreps |
| Typ≠ | Equity/FX Model | Equity/FX Model | Fundamental Principle |
| Wegweisende Quelle≠ | Bates, D. S. (1996). Jumps and stochastic volatility: Exchange rate processes implicit in Deutsche Mark options. Review of Financial Studies, 9(1), 69-107. DOI ↗ | Dupire, B. (1994). Pricing with a smile. Risk Magazine, 7(1), 18-20. link ↗ | Harrison, J. M., & Kreps, D. M. (1979). Martingales and arbitrage in multiperiod securities markets. Journal of Economic Theory, 20(3), 381-408. DOI ↗ |
| Aliasnamen | SVJ Model, Jump Diffusion | Deterministic Volatility Function, DVF | Risk-Neutral Measure, Q-Measure |
| Verwandt | 4 | 4 | 4 |
| Zusammenfassung≠ | The Bates model (1996) combines stochastic volatility and jump diffusion to capture both the volatility smile and the implied volatility skew observed in equity and currency option markets. It extends the Heston model by adding a Poisson jump component to returns, making it suitable for pricing options when sudden price moves are expected. | Dupire's local volatility model (1994) is a deterministic framework that extracts a term and strike-dependent volatility function from market option prices. Unlike constant volatility, local volatility perfectly fits the observed implied volatility smile and is implemented via finite difference methods for European and American option pricing. | Risk-neutral valuation (1979) is the fundamental principle that derivative prices equal the expected payoff discounted at the risk-free rate, computed under a risk-neutral probability measure (Q-measure). This principle, formalized by Harrison and Kreps, eliminates the need to estimate risk premia and is the foundation of modern derivatives pricing. |
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