https://orcid.org/0000-0003-4023-6352
References
- Seidel-Morgenstern A. Experimental determination of single solute and competitive adsorption isotherms. J. Chromatogr. A. 2004;1037:255–272.
- Lindholm J, Forssen P, Fornstedt T. Validation of the accuracy of the perturbation peak method for determination of single and binary adsorption isothermparameters in LC. Anal. Chem. 2004;76:4856–4865.
- Sing K, Everett D, Haul R, et al. Reporting physisorption data for gas/solid systems with special reference to the determination of surface area and porosity. Pure Appl. Chem. 1985;57:603–619.
- Guiochon G, Shirazi G, Katti M. Fundamentals of preparative and nonlinear chromatography. 2nd ed. Netherlands: Elsevier; 2006.
- Guiochon G, Lin B. Modeling for preparative chromatography. New York (NY): Academic Press; 2003.
- Haghpanah R, Rajendran A, Farooq S, et al. Discrete equilibrium data from dynamic column breakthrough experiments. Ind. Eng. Chem. Res. 2012;51:14834–14844.
- Forssén P, Fornstedt T. A model free method for estimation of complicated adsorption isotherms in liquid chromatography. J. Chromatogr. A. 2015;1409:108–115.
- James F, Sepulveda M. Parameter identification for a model of chromatographic column. Inverse Probl. 1994;10:1299. doi:10.1088/0266-5611/10/6/008.
- Forssén P, Arnell R, Fornstedt T. An improved algorithm for solving inverse problems in liquid chromatography. Comput. Chem. Eng. 2006;30:1381–1391.
- Lisec O, Hugo P, Seidel-Morgenstern A. Frontal analysis method to determine competitive adsorption isotherms. J. Chromatogr. A. 2001;908:19–34.
- Kohn R, Vogelius M. Determining conductivity by boundary measurements. Commun. Pure Appl. Math. 1984;37:289–298.
- Afraites L, Dambrine M, Kateb D. Conformal mappings and shape derivatives for the transmission problem with a single measurement. Numer. Funct. Anal. Optim. 2007;28:519–551.
- Ruthven DM. Principles of adsorption and adsorption processes. New York (NY): Wiley; 1984.
- Horvath C. In high-performance liquid chromatography: advances and perspectives (volume 5). New York (NY): Academic Press; 1988.
- Javeed S, Qamar S, Seidel-Morgenstern A, et al. Efficient and accurate numerical simulation of nonlinear chromatographic processes. Comput. Chem. Eng. 2011;35:2294–2305.
- Rudin W. Functional analysis. 2nd ed. New York (NY): McGraw-Hill Science; 1991.
- Ladyzhenskaya O, Solonnikov V, Uraltseva N. Linear and quasi-linear equations of parabolic type. London: American Mathematical Society; 1991.
- Lieberman G. Second order parabolic differential equations. London: World Scientific Publishing; 2005.
- Song SJ, Huang JG. Solving an inverse problem from bioluminescence tomography by minimizing an energy-like functional. J. Comput. Anal. Appl. 2012;14:544–558.
- Cheng X, Gong R, Han W. A new kohn-vogelius type formulation for inverse source problems. Inverse probl. Imaging. 2015;9:1051–1067.
- Felinger A, Zhou D, Guiochon G. Determination of the single component and competitive adsorption isotherms of the 1-indanol enantiomers by the inverse method. J. Chromatogr. A. 2003;1005:35–49.
- Dose EV, Jacobson S, Guiochon G. Determination of isotherms from chromatographic peak shapes. Anal. Chem. 1991;63:833–839.
- Barzilai J, Borwein J. Two-point step size gradient methods. IMA J. Numer. Anal. 1988;8:141–148.
- James F, Sepulveda M, Charton F, et al. Determination of binary competitive equilibrium isotherms from the individual chromatographic band profiles. Chem. Eng. Sci. 1999;54:1677–1696.
- Gritti F, Guiochon G. Mass transfer kinetics, band broadening and column efficiency. J. Chromatogr. A. 2012;1221:2–40.
- Miyabe K, Guiochon G. Measurement of the parameters of the mass transfer kinetics in high performance liquid chromatography. J. Sep. Sci. 2003;26:155–173.
- Tikhonov A, Goncharsky A, Stepanov V, et al. Numerical methods for the solution of ill-posed problems. Dordrecht: Kluwer; 1995.
- Tikhonov A, Leonov A, Yagola A. Nonlinear ill-posed problems. Vol. i and ii. London: Chapman and Hall; 1998.
- Davis T. Algorithm 832: Umfpack v4.3-an unsymmetric-pattern multifrontal method. ACM Trans. Math. Softw. 2004;30:196–199.
- Davis T, Gilbert J, Larimore SI, et al. A column approximate minimum degree ordering algorithm. ACM Trans. Math. Softw. 2004;30:353–376.
- Zijlema M, Wesseling P. Higher-order flux-limiting schemes for the finite volume computation of incompressible flow. Int. J. Comput. Fluid Dyn. 1998;9:89–109.
- Goldberg DE. Genetic algorithms in search, optimization, and machine learning. Boston (MA): Addison-Wesley; 1989.