Convex Regularization of Local Volatility Estimation in a Discrete Setting
We apply convex regularization techniques to the problem of calibrating the local volatility surface model of Dupire taking into account the practical requirement of discrete grids and noisy data. Such requirements are the consequence of bid and ask spreads, quantization of the quoted prices and lac...
Saved in:
Main Authors | , , |
---|---|
Format | Journal Article |
Language | English |
Published |
12.08.2013
|
Subjects | |
Online Access | Get full text |
Cover
Loading…
Summary: | We apply convex regularization techniques to the problem of calibrating the
local volatility surface model of Dupire taking into account the practical
requirement of discrete grids and noisy data. Such requirements are the
consequence of bid and ask spreads, quantization of the quoted prices and lack
of liquidity of option prices for strikes far way from the at the money level.
We obtain convergence rates and results comparable to those obtained in the
idealized continuous setting. Our results allow us to take into account
separately the uncertainties due to the price noise and those due to
discretization errors. Thus allowing better discretization levels both in the
domain and in the image of the parameter to solution operator.
We illustrate the results with simulated as well as real market data. We also
validate the results by comparing the implied volatility prices of market data
with the computed prices of the calibrated model. {10pt}
\noindent {\bf Keywords:} Convex regularization, local volatility surfaces,
regularization convergence rates, numerical methods for volatility calibration. |
---|---|
DOI: | 10.48550/arxiv.1308.2659 |