[1] B. Abbasi, A.H.E. Jahromi, J. Arkat, and M. Hosseinkouchack. Estimating the parameters of Weibull distribution using simulated annealing algorithm. Applied Mathematics and
Computation, 183:85-93, 2006.
[2] D.M. Bates and D.G. Watts. Nonlinear regression analysis and its applications. Wiley, New
York, 1988.
REFERENCES
244
[3] Â. Björck. Numerical Methods for Least Squares Problems. SIAM, Philadelphia, 1996.
[4] PT. Boggs, R.H. Byrd, and R.B. Schnabel. A stable and efficient algorithm for nonlinear orthogonal distance regression. SIAM Journal on Scientific and Statistical Computation, 8:1052-1078, 1987.
[ 5] A.C. Cohen and B.J. Whitten. Parameter Estimation in Reliability and Life Span Models. Marcel Dekker Inc., New York and Basel, 1988.
[ 6] P. Erto. New Practical Bayes estimators for the 2-Parameter Weibull distribution. IEEE Transactions on Reliability, R-31:194-197, 1982.
[ 7] W.A. Fuller. Measurement Error Models. Wiley, New York, 2006.
[8] EE. Gill, W. Murray, and M.H. Wright. Practical Optimization. Academic Press, London,
1981.
[9] G.H Golub and C.F. Van Loan. An analysis of the total least squares problem. SIAM Journal
on Numerical Analysis, 17:883-893, 1980.
[10] S. Van Huffel and H. Zha. The Total Least Squares Problem. Elsevier, North-Holland, Am¬sterdam, 1993.
[11] D. JukiC On the ls-norm generalization of the NLS method for the Bass model. European Journal of Pure and Applied Mathematics, 6:435-450, 2013.
[12] D. Jukic and D. Markovic. On nonlinear weighted errors-in-variables parameter estima¬tion problem in the three-parameter Weibull model. Applied Mathematics and Computa¬tion, 215:3599-3609, 2010.
[13] D. Jukic and D. Markovic. On nonlinear weighted least squares fitting of the three-parameter inverse Weibull distribution. Mathematical Communications, 15:13-24, 2010.
[14] D. Juki,, M. Bensic", and R. Scitovski. On the existence of the nonlinear weighted least squares estimate for a three-parameter Weibull distribution. Computational Statistics and
Data Analysis, 52:4502-4511, 2008.
[15] D. Jukic, K. Sabo, and R. Scitovski. Total least squares fitting Michaelis-Menten enzyme kinetic model function. Journal ofComputational and Applied Mathematics, 201:230¬246, 2007.
[16] D. Jukic, R. Scitovski, and H. Spâth. Partial linearization of one class of the nonlinear total least squares problem by using the inverse model function. Computing, 62:163-178,
1999.
[17] D. Jukic and R. Scitovski. Existence results for special nonlinear total least squares prob¬lem. Journal ofMathematical Analysis and Applications, 226:348-363, 1998.
REFERENCES
245
[18] J.F. Lawless. Statistical models and methods for lifetime data. Wiley, New York, 1982.
[19] D. Markovic, D. Jukic, and M. Bensic. Nonlinear weighted least squares estimation of a three-parameter Weibull density with a nonparametric start. Journal ofComputational
and Applied Mathematics, 228:304-312, 2009.
[20] M. Marusic, D. Markovic, and D. Jukic. Least squares fitting the three-parameter inverse Weibull density. Mathematical Communications, 15:539-553, 2010.
[21] D.N.P Murthy, M. Xie, and R. Jiang. Weibull Models. Wiley, New York, 2004.
[22] W. Nelson. Applied life data analysis. Wiley, New York, 1982.
[ 23] K. Sabo and R. Scitovski. The best least absolute deviations line - properties and two efficient methods for its derivation. ANZIAM Journal., 50:185-198, 2008.
[ 24] H. Schwetlick and V. Tiller. Numerical methods for estimating parameters in nonlinear models with errors in the variables. Technometrics, 27:17-24, 1985.
[25] G.A.F. Seber and C.J. Wild. Nonlinear Regression. Wiley, New York, 1989.
[26] B.W. Silverman. Density estimation for Statistics and Data Analysis. Chapman & Hall/CRC, Boca Raton, 2000.
[ 27] R.L. Smith and J.C. Naylor. A comparison of maximum likelihood and Bayesian estima¬tors for the three-parameter Weibull distribution. Biometrika, 73:67-90, 1987.
[ 28] R.L. Smith and J.C. Naylor. Statistics of the three-parameter Weibull distribution. Annals
ofOperations Research, 9:577-587, 1987.
[ 29] R. A. Tapia and J. R. Thompson. Nonparametric probabilitydensityestimation. Johns Hop¬kins University Press, Baltimore, 1978.
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