References
- Abourashchi , N. , and Veretennikov , A. in press . On exponential mixing bounds and convergence rate for Student processes . Theory Probab. Math. Statist.
- Abramowitz , M. , and Stegun , I.A. 1964. Handbook of Mathematical Functions . The National Bureau of Standards , Gaithersburg , MD, USA.
- Anh , V.V. , Leonenko , N.N. , and Sakhno , L.M. 2004 . On a class of minimum contrast estimators for fractional stochastic processes and fields . Journal of Statistical Planning and Inference 123 ( 1 ): 161 – 185 .
- Avram , F. , Leonenko , N.N. , and Rabehasaina , L. 2009 . Series expansions for the first passage distribution of Wong-Pearson jump-diffusion . Stochastic Analysis and Applications 27 ( 4 ): 770 – 796 .
- Avram , F. , Leonenko , N.N. , and Šuvak , N. 2010 . Statistical analysis of Fisher-Snedecor diffusion, submitted.
- Barbato , D. 2005 . FKG inequality for Brownian motion and stochastic differential equations . Electronic Communications in Probability 10 : 7 – 16 .
- Barbour , A.D. 1990 . Stein method for diffusion approximations . Probability Theory and Related Fields 84 : 297 – 322 .
- Bibby , B.M. , Skovgaard , I.M. , and Sørensen , M. 2005 . Diffusion-type models with given marginal distribution and autocorrelation function . Bernoulli 11 ( 2 ): 281 – 299 .
- Bontemps , C. , and Meddahi , N. 2008 . Testing distributional assumptions: A GMM approach . Journal of Applied Econometrics . Submitted.
- Bontemps , C. , Meddahi , N. 2005 . Testing normality: A GMM approach . Journal of Econometrics 124 : 149 – 186 .
- Borodin , A.N. , and Salminen , P. 1996 . Handbook of Brownian Motion: Facts and Formulae . Probability and Its Applications, Birkhä user, Basel.
- Bulinski , A. , and Shashkin , S. 2007 . Limit Theorems for Associated Random Fields and Related Systems . World Scientific , Singapore .
- Chihara , T.S. 1978 . An Introduction to Orthogonal Polynomials , Gordon and Breach , New York .
- Davydov , D. , and Linetsky , V. 2003 . Pricing options on scalar diffusions: An eigenfunction expansion approach . Operations Research 51 : 185 – 209 .
- Doukhan , P. 1994 . Mixing: Properties and Examples . In Lecture Notes in Statistis . Springer , New York .
- Erdely , A. 1953 . Higher Transcendental Functions . Vol. 1. McGraw-Hill , New York .
- Forman , J.L. , and Sørensen , M. 2008 . The Pearson diffusions: A class of statistically tractable diffusion processes . Scandinavian Journal of Statistics 35 ( 3 ): 438 – 465 .
- Fulton , C.T. , Pruess , S. , and Xie , Y. 2005 . The automatic classification of Sturm–Liouvuille problems . Journal of Applied Mathematics and Computation 124 : 149 – 186 .
- Genon-Catalot , V. , Jeantheau , T. , and Laredo , C. 2000 . Stochastic volatility models as hidden Markov models and statistical applications . Bernoulli 6 ( 6 ): 1051 – 1079 .
- Heikkinen , V. , and Kanto , A. 2002 . Value-at-risk estimation using non-integer degrees of freedom of Student's distribution . Journal of Risk 4 ( 4 ): 77 – 84 .
- Heyde , C.C. , and Leonenko , N.N. 2005 . Student processes . Advanced Applied Probability 37 : 342 – 365 .
- It\^o, K., and McKean , H. 1974 . Diffusion Processes and Their Sample Paths . Springer , New York .
- Jacobsen , M. 1996 . Laplace and the origin of the Ornstein–Uhlenbeck proceses . Bernoulli 2 : 271 – 286 .
- Karlin , S. , and Taylor , H.M. 1981 . A First Course in Stochastic Processes . Academic Press , New York .
- Karlin , S. , and Taylor , H.M. 1981 . A Second Course in Stochastic Processes . Academic Press , New York .
- Koepf , W. , and Masjed-Jamei , M. 2007 . Two classes of special functions using Fourier transforms of some finite classes of classical orthogonal polynomials . Proceedings of the American Mathematical Society 135 : 3599 – 3606 .
- Kutoyants , Y.A. 2004 . Statistical Inference for Ergodic Diffusion Processes . Springer , New York .
- Kutoyants , Y.A. , and Yoshida , N. 2007. Moment estimation for ergodic diffusion processes. Bernoulli 13(4):933–951.
- Leonenko , N.N. , and Sakhno , L.M. 2006 . On the Whittle estimators for some classes of continuous – parameter random processes and fields . Statistics and Probability Letters 76 : 781 – 795 .
- Leonenko , N.N. , and Šuvak , N. 2010 . Statistical inference for reciprocal gamma diffusion process . Journal of Statistical Planning and Inference 140 : 30 – 51 .
- Lesky , P.A. 1998 . Einordnung der Polynome von Romanovski-Bessel in das Askey-Tableau . Z. Angew. Math. Mech. 78 ( 9 ): 646 – 648 .
- Linetsky , V. 2004 . The spectral decomposition of optional value . International Journal of Theoretical and Applied Finance 7 ( 3 ): 337 – 384 .
- Linetsky , V. 2004 . Spectral expansions for Asian (average price) options . Operation Research 52 ( 6 ): 856 – 867 .
- Linetsky , V. 2006 . Pricing equity derivatives subject to bankruptcy . Mathematical Finance 16 ( 2 ): 255 – 282 .
- Luke , Y.L. 1969 . The Special Functions and Their Approximations . Academic Press , San Diego .
- Masjed-Jamei , M. 2002 . Three finite classes of hypergeometric orthogonal polynomials and their application in functions approximation . Integral Transforms and Special Functions 13 : 169 – 191 .
- Masjed-Jamei , M. 2004 . Classical orthogonal polynomials with weight function ((ax + b)2 + (cx + d)2)−p exp {q arctg((ax + b)/(cx + d))}, x ∈ ⟨−∞, ∞ ⟩ and generalisations of T and F distributions . Integral Transforms and Special Functions 15 : 137 – 153 .
- Mendoza , R. , Carr , P. , and Linetsky , V. 2009 . Time changed Markov processes in unified credit-equity modeling . Mathematical Finance . To appear.
- Nikiforov , A.F. , and Uvarov , V.B. 1988 . Special Functions of Mathematical Physics . Birkhäuser , Basel .
- Pearson , K. 1914 . Tables for Statisticians and Biometricians . Cambridge University Press , Cambridge , UK .
- Romanovski , V. 1929 . Sur quelques classes nouvelles de polynomes orthogonaux [On some new classes of orthogonal polynomials] . Calcul de Probabilités 1023 – 1025 .
- Routh , E.J. 1885 . On some properties of certain solutions of a differential equation of the second order . Proceedings of London Mathematical Society 16 : 245 – 261 .
- Sarmanov , O.V. 1961 . Investigation of stationary Markov processes by the method of eigenfunctions . Trudy Math. Inst. Steklov (Trans. Prec. Steklov Inst. Math.) 60 : 238 – 261 .
- Schoutens , W. 2000 . Stochastic Processes and Orthogonal Polynomials . Springer , New York .
- Serfling , R.J. 1980 . Approximation Theorems of Mathematical Statistics . John Wiley & Sons , New York .
- Shaw , W. T. 2009 . A model of returns for the post-credit-crunch reality: Hybrid Brownian motion with price feedback. Retrieved September 30, 2010, from http://arxiv.org/PS-cache/arxiv/pdf/0811/0811.0182v5.pdf
- Slater , L.J. 1966 . Generalized Hypergeometric Functions . Cambridge University Press , London .
- Szegö , G. 1939 . Orthogonal Polynomials . American Mathematical Society , Providence , RI .
- Titchmarsh , E.C. 1962 . Eigenfunctions Expansions Associated with Second Order Differential Equations . Part 1 , Claredon Press , Oxford , UK .
- Weber , H.J. 2007 . Connections between Romanovski and other polynomials . Central European Journal of Mathematics 5 : 581 – 595 .
- Wong , E. 1964 . The construction of a class of stationary Markov processes . In Sixteen Symposium in Applied Mathematics—Stochastic Processes in Mathematical Physics and Engineering . Bellman , R. (ed.), American Mathematical Society , Providence , RI , pp. 264 – 276 .