Option Pricing via Breakeven Volatility

被引:1
|
作者
Hull, Blair [1 ]
Li, Anlong [1 ]
Qiao, Xiao [2 ,3 ]
机构
[1] Hull Tact Asset Allocat LLC, Chicago, IL USA
[2] City Univ Hong Kong, Hong Kong, Peoples R China
[3] Hong Kong Inst Data Sci, Hong Kong, Peoples R China
来源
FINANCIAL ANALYSTS JOURNAL | 2023年 / 79卷 / 01期
关键词
options; prediction; trading strategy; volatility; NONPARAMETRIC APPROACH; EMPIRICAL PERFORMANCE; STOCK RETURNS; IMPLICIT;
D O I
10.1080/0015198X.2022.2100234
中图分类号
F8 [财政、金融];
学科分类号
0202 ;
摘要
The fair value of an option is given by breakeven volatility, the value of implied volatility that sets the profit and loss of a delta-hedged option to zero. We calculate breakeven volatility for 400,000 options on the S&P 500 and build a predictive model for these volatilities. A two-stage regression approach captures the majority of the observed variation. By providing a link between option characteristics and breakeven volatility, we establish a non-parametric approach to pricing options without the need to specify the underlying price process. We illustrate the economic value of our approach with a simulated trading strategy based on breakeven volatility predictions.
引用
收藏
页码:99 / 119
页数:21
相关论文
共 50 条
  • [21] Option pricing under stochastic volatility models with latent volatility
    Begin, Jean-Francois
    Godin, Frederic
    [J]. QUANTITATIVE FINANCE, 2021,
  • [22] Pricing double volatility barriers option under stochastic volatility
    Han, Yuecai
    Liu, Chunyang
    Song, Qingshuo
    [J]. STOCHASTICS-AN INTERNATIONAL JOURNAL OF PROBABILITY AND STOCHASTIC PROCESSES, 2021, 93 (04) : 625 - 645
  • [23] Two factor option pricing with uncertain volatility
    Pooley, DM
    Forsyth, PA
    Vetzal, KR
    [J]. COMPUTATIONAL SCIENCE AND ITS APPLICATIONS - ICCA 2003, PT 3, PROCEEDINGS, 2003, 2669 : 158 - 167
  • [24] Stochastic volatility models with application in option pricing
    Gong H.
    Thavaneswaran A.
    Singh J.
    [J]. Journal of Statistical Theory and Practice, 2010, 4 (4) : 541 - 557
  • [25] Pricing of derivatives option with stochastic prices volatility
    [J]. Chen, J., 2005, Xi'an Jiaotong University (39):
  • [26] A fast calibrating volatility model for option pricing
    Date, Paresh
    Islyaev, Suren
    [J]. EUROPEAN JOURNAL OF OPERATIONAL RESEARCH, 2015, 243 (02) : 599 - 606
  • [27] CAM Stochastic Volatility Model for Option Pricing
    Huang, Wanwan
    Ewald, Brian
    Oekten, Giray
    [J]. MATHEMATICAL PROBLEMS IN ENGINEERING, 2016, 2016
  • [28] Option pricing using stochastic volatility models
    Nögel, U
    [J]. PROGRESS IN INDUSTRIAL MATHEMATICS AT ECMI 2002, 2004, 5 : 221 - 225
  • [29] OPTION PRICING WITH TRANSACTION COSTS AND STOCHASTIC VOLATILITY
    Florescu, Ionut
    Mariani, Maria C.
    Sengupta, Indranil
    [J]. ELECTRONIC JOURNAL OF DIFFERENTIAL EQUATIONS, 2014,
  • [30] Homoskedastis or Heteroskedastis Volatility Model for Option Pricing?
    Hendrawan, Riko
    [J]. APPLIED ECONOMICS, BUSINESS AND DEVELOPMENT, 2010, : 221 - 224
12345