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Valuation equations for stochastic volatility models
- Publication Year :
- 2010
-
Abstract
- We analyze the valuation partial differential equation for European contingent claims in a general framework of stochastic volatility models where the diffusion coefficients may grow faster than linearly and degenerate on the boundaries of the state space. We allow for various types of model behavior: the volatility process in our model can potentially reach zero and either stay there or instantaneously reflect, and the asset-price process may be a strict local martingale. Our main result is a necessary and sufficient condition on the uniqueness of classical solutions to the valuation equation: the value function is the unique nonnegative classical solution to the valuation equation among functions with at most linear growth if and only if the asset-price is a martingale.<br />Comment: Keywords: Stochastic volatility models, valuation equations, Feynman-Kac theorem, strict local martingales, necessary and sufficient conditions for uniqueness
- Subjects :
- Mathematical optimization
stochastic volatility models
valuation equations
strict local martingale
Feynman-Kac theorem
01 natural sciences
FOS: Economics and business
010104 statistics & probability
Bellman equation
FOS: Mathematics
jel:C1
Applied mathematics
HA Statistics
Uniqueness
0101 mathematics
Mathematics
Numerical Analysis
Partial differential equation
Stochastic volatility
Applied Mathematics
Probability (math.PR)
010102 general mathematics
Degenerate energy levels
Local martingale
Pricing of Securities (q-fin.PR)
Volatility (finance)
Martingale (probability theory)
Quantitative Finance - Pricing of Securities
Mathematics - Probability
Finance
Subjects
Details
- Database :
- OpenAIRE
- Accession number :
- edsair.doi.dedup.....c720cf313972c66961642c043395ebed