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Journal of Statistical Computation and Simulation Volume 86, 2016 - Issue 1
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Original Articles

Evidential inference for diffusion-type processes

Aniseh DadgarDepartment of Statistics, School of Mathematical Sciences, Ferdowsi University of Mashhad, Mashhad91775, Iran
,
Khalil ShafieDepartment of Applied Statistics and Research Methods, University of Northern Colorado, Greeley, CO, USACorrespondence[email protected]
&
Mahdi EmadiDepartment of Statistics, School of Mathematical Sciences, Ferdowsi University of Mashhad, Mashhad91775, Iran
Pages 183-194 | Received 09 Apr 2014, Accepted 21 Dec 2014, Published online: 19 Jan 2015

References

  • Grenander U. Stochastic processes and statistical inference. Ark Mat. 1950;1:195–277. doi: 10.1007/BF02590638
  • Grenander U. Abstract inference. New York: Wiley; 1981.
  • Anderson TW, Goodman LA. Statistical inference about Markov chains. Ann Math Stat. 1957;28:89–110. doi: 10.1214/aoms/1177707039
  • Billingsley P. Statistical inference for Markov processes. Chicago: University of Chicago Press; 1961.
  • Hajek J. On linear statistical problems m stochastic processes. Cz Math J. 1962;12:404–444.
  • Rao MM. Inference in stochastic processes, I. Theory Prob Appl. 1963;VTII:266–281. doi: 10.1137/1108030
  • Liptser RS, Shiryayev AN. Statistics of random processes, Vol. 1. New York: Springer; 1977.
  • Parakasa Rao BLS. Statistical inference for diffusion type processes. London: Arnold/New York: Oxford University Press; 1999.
  • Le Breton A. Parameter estimation in a linear stochastic differential equation. In: J. Kožešnik, editor. Transactions of the Seventh Prague conference on information theory, statistical decision functions, random processes and of the 1974 European meeting of statisticians. Dordrecht: Springer, 1977. p. 353–366.
  • Kutoyants YA. Estimation of the drift coefficient parameter of a diffusion in the smooth case. Theory Probab Appl. 1977;22:399–406. doi: 10.1137/1122047
  • Yoshida N. Estimation for diffusion processes from discrete observation. J Multivariate Anal. 1992;41:220–242. doi: 10.1016/0047-259X(92)90068-Q
  • Hoffmann M. Adaptive estimation in diffusion processes. Stoch Process Appl. 1999;79:135–163. doi: 10.1016/S0304-4149(98)00074-X
  • Pedersen AR. Consistency and asymptotic normality of an approximate maximum likelihood estimator for discretely observed diffusion processes. Bernoulli. 1995;1:257–279. doi: 10.2307/3318480
  • Pedersen AR. A new approach to maximum likelihood estimation for stochastic differential equations based on discrete observations. Scand J Statist. 1995;22:55–71.
  • Ait-Sahalia Y. Transition densities for interest rate and other nonlinear diffusions. J Financ. 1999;54:1361–1395. doi: 10.1111/0022-1082.00149
  • Sorensen H. Inference for diffusion processes and stochastic volatility models, Ph.D. thesis, University of Copenhagen; 2000 [cited 2015 Jan 13]. Available from: http://www.math.ku.dk/noter/filer/phd00hs.pdf
  • Pedersen AR. Estimating the nitrous oxide emission rate from the soil surface by means of a diffusion model. Scand J Statist. 2000;27:385–403. doi: 10.1111/1467-9469.00196
  • Eraker B. MCMC analysis of diffusion models with application to finance. J Bus and Econom Statist. 2001;19:177–191. doi: 10.1198/073500101316970403
  • Bibby BM, Sorensen M. Simplified estimating functions for diffusion models with a high-dimensional parameter. Scand J Statist. 2001;28:99–112. doi: 10.1111/1467-9469.00226
  • Ait-Sahalia Y. Maximum likelihood estimation of discretely sampled diffusions: a closed-form approximation approach. Econometrica. 2002;70:223–262. doi: 10.1111/1468-0262.00274
  • Durham GB, Gallant AR. Numerical techniques for maximum likelihood estimation of continuous-time diffusion processes. J Bus Econ Statist. 2002;20:297–338. doi: 10.1198/073500102288618397
  • Bibby BM, Skovgaard IM, Sorensen M. Diffusion-type models with given marginal distribution and autocorrelation function. Bernoulli. 2005;11:191–220. doi: 10.3150/bj/1116340291
  • Chen SX, Gao J, Tang CY. A test for model specification of diffusion processes. Ann Stat. 2008;36:167–198. doi: 10.1214/009053607000000659
  • Boukhetala K, Guidoum A. Sim.DiffProc: A package for simulation of diffusion processes in r, Preprint submitted to Journal of Statistical Software; 2011 [cited 2015 Jan 13]. Available from: https://hal.archives-ouvertes.fr/hal-00629841
  • Neyman J. A first course in probability and statistics. New York: Henry Holt and Company; 1950.
  • Hacking I. Logic of statistical inference. New York: Cambridge University Press; 1965.
  • Royall R. Statistical evidence: a likelihood paradigm. London: Chapman and Hall; 1997.
  • Jeffreys H. Theory of probability. New York: Oxford University Press; 1961.
  • Edwards AW. Likelihood. Baltimore (MD): Johns Hopkins University Press; 1992. expanded ed.
  • Royall R. On the probability of observing misleading statistical evidence. JASA Theory Methods. 2000;95:760–780.
  • Blume JD. Likelihood methods for measuring statistical evidence. Statist Med. 2002;21:2563–2599. doi: 10.1002/sim.1216
  • Royall R, Tsou T-S. Interpreting statistical evidence by using imperfect models: robust adjusted likelihood functions. J R Statist Soc B. 2003;65:391–404. part 2. doi: 10.1111/1467-9868.00392
  • Bjornstad JF. Likelihood and statistical evidence in survey sampling. Stat Transit. 2003;6:23–31.
  • De Santis F. Statistical evidence and sample size determination for Bayesian hypothesis testing. J Statist Plan Inference. 2004;124:121–144. doi: 10.1016/S0378-3758(03)00198-8
  • Emadi M, Ahmadi J, Arghami NR. Comparison of record data and random observations based on statistical evidence. Statist Pap. 2006;48:1–21. doi: 10.1007/s00362-006-0313-z
  • Blume JD. How to choose a working model for measuring the statistical evidence about a regression parameter. Int Statist Rev. 2005;73:351–363. doi: 10.1111/j.1751-5823.2005.tb00153.x
  • Blume JD, Su L, Olveda RM, McGarvey ST. Statistical evidence for GLM regression parameters: a robust likelihood approach. Stat Med. 2007;26:2919–2936. doi: 10.1002/sim.2759
  • Thompson B. The nature of statistical evidence. New York: Springer; 2007.
  • Arashi M, Emadi M. Evidential inference based on record data and inter-record times. Statistical Papers. 2008;49:291–301. doi: 10.1007/s00362-006-0013-8
  • Kateri M, Balakrishnan N. Statistical evidence in contingency tables analysis. J Stat Plan Infer. 2008;138:873–887. doi: 10.1016/j.jspi.2007.02.005
  • Hoch JS, Blume JD. Measuring and illustrating statistical evidence in a cost-effectiveness analysis. J Health Econ. 2008;27:476–495. doi: 10.1016/j.jhealeco.2007.07.002
  • Emadi M. Mixture models in view of evidential analysis. Communications in Statistics-Simulation and Computation. 2013;42:1824–1835.
  • Kallianpur G. Stochastic filterinbg theory. New York: Springer; 1980.

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