Jumps in Equity Index Returns Before and During the Recent Financial Crisis: A Bayesian Analysis

References

• Abate J, Whitt W (1995) Numerical inversion of Laplace transforms of probability distributions. ORSA J. Comput. 7:36–43.Link, Google Scholar
• Aït-Sahalia Y, Jacod J (2011) Testing whether jumps have finite or infinite activity. Ann. Statist. 39:1689–1719.Crossref, Google Scholar
• Bakshi G, Cao C, Chen Z (1997) Empirical performance of alternative option pricing models. J. Finance 52:2003–2049.Crossref, Google Scholar
• Bates D (2012) U.S. stock market crash risk, 1926–2010. J. Financial Econom. 105:229–259.Crossref, Google Scholar
• Chen N, Kou S (2009) Credit spreads, optimal capital structure, and implied volatility with endogenous default and jump risk. Math. Finance 19:343–378.Crossref, Google Scholar
• Chernov M, Gallant R, Ghysels E, Tauchen G (2003) Alternative models for stock price dynamics. J. Econometrics 116:225–257.Crossref, Google Scholar
• Duffee G (1995) Stock returns and volatility a firm-level analysis. J. Financial Econom. 37:399–420.Crossref, Google Scholar
• Duffie D, Pan J, Singleton K (2000) Transform analysis and asset pricing for affine jump-diffusions. Econometrica 68:1343–1376.Crossref, Google Scholar
• Eraker B (2004) Do stock prices and volatility jump? Reconciling evidence from spot and option prices. J. Finance 59:1367–1404.Crossref, Google Scholar
• Eraker B, Johannes M, Polson N (2003) The impact of jumps in volatility and returns. J. Finance 58:1269–1300.Crossref, Google Scholar
• Gilks WR, Best NG, Tan KKC (1995) Adaptive rejection Metropolis sampling within Gibbs sampling. Appl. Statist. 44:455–472.Crossref, Google Scholar
• Heyde C, Kou S (2004) On the controversy over tailweight of distributions. Oper. Res. Lett. 32:399–408.Crossref, Google Scholar
• Jacquier E, Polson N, Rossi P (1994) Bayesian analysis of stochastic volatility models. J. Bus. Econom. Statist. 12:371–389.Google Scholar
• Johannes M, Polson N (2010) MCMC methods for continuous-time financial econometrics. Aït-Sahalia Y, Hansen LP, eds. Handbook of Financial Econometrics, Vol. 2 (North-Holland, Oxford, UK), 1–72.Crossref, Google Scholar
• Johannes M, Kumar R, Polson N (1999) State dependent jump models: How do US equity indices jump? Working paper, University of Chicago, Chicago.Google Scholar
• Kou S (2002) A jump diffusion model for option pricing. Management Sci. 48:1086–1101.Link, Google Scholar
• Li H, Wells M, Yu C (2008) A Bayesian analysis of return dynamics with Levy jumps. Rev. Financial Stud. 21:2345–2378.Crossref, Google Scholar
• Pan J (2002) The jump-risk premia implicit in options: Evidence from an integrated time-series study. J. Financial Econom. 63:3–50.Crossref, Google Scholar
• Ramezani CA, Zeng Y (2007) Maximum likelihood estimation of the double exponential jump-diffusion process. Ann. Finance 3:487–507.Crossref, Google Scholar
• Singleton K (2006) Empirical Dynamic Asset Pricing (Princeton University Press, Princeton, NJ).Google Scholar
• Yu C, Li H, Wells M (2011) Estimation of Levy jump models under the risk neutral and physical measure using stock and option prices. Math. Finance 21:383–422.Crossref, Google Scholar