References
- Andersen , L. and Andreasen , J. 2000 . Volatility skews and extension of the LIBOR market model . Applied Mathematical Finance , 7 ( 1 ) : 1 – 32 .
- Andersen , L. and Brotherton-Ratcliffe , R. 2005 . Extended LIBOR market model with stochastic volatility . Journal of Computational Finance , 9 ( 1 ) : 1 – 29 .
- Black , F. and Scholes , M. 1973 . The pricing of options and corporate liabilities . Journal of Political Economy , 81 ( 3 ) : 637 – 659 .
- Cox , J. C . 1996 . The constant elasticity of variance option pricing model . Journal of Portfolio Management , December : 15 – 17 .
- Cox , J. C. and Ross , S. .A . 1976 . The valuation of options for alternative stochastic processes . Journal of Financial Economics , 3 January/March : 145 – 166 .
- Dewynne , J. N and Shaw , W. T . 2008 . Differential equations and asymptotic solutions for arithmetics Asian option: ‘Black–Scholes formulae’ for Asian-rate calls . European Journal of Applied Mathematics , 19 : 353 – 391 .
- Ding , C. D . 1992 . Computing the non-central χ2 distribution function . Applied Statistics , 41 ( 2 ) : 478 – 482 .
- Howison , S. D . 2005 . Matched asymptotic expansions in financial engineering . Journal of Engineering Mathematics , 53 ( 3/4 ) : 385 – 406 .
- Howison , S. D . 2007 . A matched asymptotic expansions approach to continuity corrections for discretely sampled options. Part 2: Bermudan options . Applied Mathematical Finance , 14 ( 1 ) : 91 – 104 .
- Howison , S. D and Steinberg , M. 2007 . A matched asymptotic expansions approach to continuity corrections for discretely sampled options. Part 1: barrier options . Applied Mathematical Finance , 14 ( 1 ) : 63 – 89 .
- Marris , D. 1999 . Financial option pricing and skewed volatility , MPhil thesis, University of Cambridge .
- Muck , M. 2005 . On the similarity between displaced-diffusion and constant elasticty of variance market models of the term structure , Preprint, WHU, Otto Beisheim Graduate School of Management .
- Piterbarg , V. V . 2005 . A stochastic volatility model with time dependent skew . Applied Mathematical Finance , 12 ( 2 ) : 147 – 185 .
- Rebonato , R. 2002 . Modern Pricing of Interest-Rate Derivatives: The LIBOR Market Model and Beyond , Princeton: Princeton University Press .
- Rebonato , R. 2004 . Volatility and Correlation , 2nd , New York : Wiley .
- Rubinstein , M. 1983 . Displaced diffusion option pricing . Journal of Finance , 38 ( 1 ) : 213 – 217 .
- Schroder , M. 1989 . Computing the constant elasticity of variance option pricing formula . Journal of Finance , 44 ( 1 ) : 211 – 219 .
- Shaw , W. T . 1998 . Modelling Financial Derivatives with Mathematica , Cambridge : Cambridge University Press .
- Svoboda, S. (2006) On the similarity between displaced diffusion and CEV processes, OCIAM, University of Oxford http://www.maths.ox.ac.uk/svoboda/