https://orcid.org/0000-0001-7965-5736
References
- Gato LMC, Henriques JCC. Dynamic behavior of high- pressure natural-gas flow in pipelines. Int J Heat Fluid Flow. 2005;26:816–825.
- Doucet A, De Freitas N, Gordon N. Sequential Monte Carlo methods in practice. New York: Springer; 2001; 178–195.
- Kaipio J, Somersalo E. Statistical and computational inverse problems, applied mathematical sciences 160. New York: Springer-Verlag; 2004.
- Ristic B, Arulampalam S, Gordon N. Beyond the kalman filter. Boston: Artech House; 2004.
- Arulampalam S, Maskell S, Gordon N, et al. A tutorial on particle filters for on-line non-linear/non-Gaussian Bayesian tracking. IEEE Trans Signal Processing. 2001;50:174–188.
- Robert CP, Doucet A, Andrieu C. Computational advances for and from Bayesian analysis. Stat Sci. 2004;19:118–127.
- Andrieu C, Doucet A, Singh SS, et al. Particle methods for change detection, system identification, and control. Proc IEEE. 2004;92:423–438.
- Arulampalam MS, Maskell S, Gordon N, et al. A tutorial on particle filters for online nonlinear/non-Gaussian Bayesian tracking. IEEE Trans Signal Process. 2002;50:174–188.
- Carpenter J, Clifford P, Fearnhead P. An improved particle filter for non-linear problems. IEEE Proc Radar Sonar Navig. 1999;146:2–7.
- Kantas N, Doucet A, Singh SS, et al. On particle methods for parameter estimation in state-space models. Stat. Sci. 2015;30:328–351.
- Del Moral P, Doucet A, Jasra A. Sequential Monte Carlo samplers. J R Stat Soc Ser B Stat Methodol. 2006;68:411–436.
- Lopes HF, Carvalho CM. Online Bayesian learning in dynamic models: an illustrative introduction to particle methods. In: West M, Damien P, Dellaportas P, Polson NG, Stephens DA, editors. Bayesian dynamic modelling, Bayesian inference and Markov chain Monte Carlo: In honour of Adrian Smith. Chapter 11. Oxford: Oxford University Press; 2013. DOI:https://doi.org/10.1093/acprof:oso/9780199695607.003.0011.
- Candy JV. Bayesian signal processing: classical, modern, and particle filtering methods. New York: John Wiley; 2008.
- Orlande HRB, Colaço MJ, Dulikravich GS, et al. State estimation problems in heat transfer. Int J Uncertainty Quant. 2012;2:239–258.
- Durgut I, Leblebicioglu K. Kalman-filter-based observer design around optimal control policy for gas pipelines. Int J Numer Methods Fluids. 1997;24:233–245.
- Singhal A, Salsbury TI. A simple method for detecting valve stiction in oscillating control loops. J Process Control. 2005;15:371–382.
- Horsh A, Isaksson AJ. A method for detection of stiction in control valves. In: Proceedings of the IFAC workshop on line Fault Detection and Supervision in the Chemical Process Industry, 1998.
- Lamien B, Orlande HRB, Eliçabe EG. Particle filter and approximation error model for state estimation in hyperthermia. J Heat Transfer. 2016;139:12001.
- Varon LAB, Orlande HRB, Eliçabe GE. Estimation of state variables in the hyperthermia therapy of cancer with heating imposed by radiofrequency electromagnetic waves. Int J Therm Sci. 2015;98:228–236.
- Lamien B, Orlande HRB, Eliçabe GE. Inverse problem in the hyperthermia therapy of cancer with laser heating and plasmonic nanoparticles. Inverse Probl Sci Eng. 2015;25(4):608–631.
- Varon LAB, Orlande HRB, Eliçabe GE. Combined parameter and state estimation in the radio frequency hyperthermia treatment of cancer. Numer Heat Transfer A: Appl. 2016;70:581–594.
- Lamien B, Varon LAB, Orlande HRB, et al. State estimation in bioheat transfer: a comparison of particle filter algorithms. Int J Numer Methods Heat Fluid Flow. 2017;27:615–638.
- Costa JMJ, Orlande HRB, Velho HFC, et al. Estimation of tumor size evolution using particle filters. J Comput Biol. 2015;22:150514113004000.
- Silva WB, Rochoux M, Orlande HRB, et al. Application of particle filters to regional-scale wildfire spread. High Temperatures – High Pressures. 2014;43:435–440.
- Colaço MJ, Orlande HRB, Da Silva W, et al. Application of two Bayesian filters to estimate unknown heat fluxes in a natural convection problem. J Heat Transfer. 2012;134:092501.
- Anderson J. Modern compressible flow with historical perspective. New York: McGraw-Hill; 1990.
- Anderson J. Computational fluid dynamics: The basics with applications. Singapore: McGraw-Hill; 1995.
- Herran A, De La Cruz JM, De Andres B, et al. Modeling and simulation of a gas distribution pipeline network. Appl Math Model. 2009;33:1584–1600.
- Nouri-Borujerdi A, Ziaei-Rad M. Simulation of compressible flow in high pressure buried gas pipelines. Int J Heat Mass Transf. 2009;52:5751–5758.
- Ortega AJ, Pires LFG, Nieckele AO. Una alternativa para la simulación numérica del comportamiento térmico en régimen. Información Tecnológica. 2009;20:83–88.
- Behbahani-Nejad M, Ghanbarzadeh A, Alamian R. Transient flow simulation in natural gas pipelines using the state space model. In: ASME Biennial Conference On Engineering Systems Design and Analysis, 10, 2010. Istanbul: ESDA2010, v.3,p. 409-415, 2010.
- Chaczykowski M. Transient flow in natural gas pipeline – the effect of pipeline thermal model. Applied Mathematical Modeling. 2010;34:1051–1067.
- Alamian R, Behbahani M, Ghanbarzadeh A. A state space model for transient flow simulation in natural gas pipelines. J Nat Gas Sci Eng. 2012;9:51–59.
- Bazargan-Lari MR, Kerachian R, Afshar H, et al. Developing an optimal valve closing rule curve for real-time pressure control in pipes. J Mech Sci Technol. 2013;27:215–225.
- Toro EF. Riemann solvers and numerical methods for fluid dynamics. 2nd ed. Berlin: Springer; 1999.
- Ozisik MN, Orlande HRB, Colaco M, et al. Finite difference methods in heat transfer. 2nd ed. Boca Raton: CRC Press; 2017.
- Yee HC. Numerical approximation of boundary conditions with applications to inviscid equations of gas dynamics. NASA Technical Memorandum 81265, 1981.
- Laney C. Computational gasdynamics. Cambridge: Cambridge University Press; 1998.
- Hutchison JW. ISA handbook of control valves. Research Triangle Park: Instrument Society of America – ISA; 1976.
- Baumann HD. ISA control valve primer. Research Triangle Park: ISA – International Standard Association; 2009.
- ANSI/ISA-75.02.01-2008. Control valve capacity test procedures. ISA – American National Standard, ANSI/ISA. ISBN: 978-1-936007-11-0, 2009.