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1	Minsta quadratmetoden ... Hultman, Frans Wilhelm, January 1860 (has links) Akademisk afhandling--Upsala. Least squares.
2	Minsta quadratmetoden ... Hultman, Frans Wilhelm, January 1860 (has links) Akademisk afhandling--Upsala. Least squares.
3	On the performance of the modified least squares estimators in some accelerated life testing models using complete and type II censored samples Soejoeti, Zanzawi. January 1977 (has links) Thesis--Wisconsin. / Vita. Includes bibliographical references (leaves 180-182). Least squares.
4	Bias in least squares regression. Williams, Douglas Harold January 1972 (has links) Much of the data analysed by least squares regression methods violates the assumption that independent variables are known without error. Also, it has been demonstrated that parameter estimates based on minimum residual sums of squares have a high probability of being unsatisfactory if the independent variables are not orthogonal. Both situations are examined jointly by Monte Carlo simulation and bias in least squares estimate of regression coefficients and error sums of squares is demonstrated. Techniques for regression under these conditions are reviewed but the literature does not present a practical algorithm in either case. / Forestry, Faculty of / Graduate Least squares.
5	Multivariable inferential estimation Nasir, Imtiaz Hussain January 2003 (has links) No description available. 660 Partial least squares
6	A study of three algorithms for nonlinear least squares parameter estimation Stilson, Mickey Linn January 2010 (has links) Digitized by Kansas Correctional Industries Least squares-- Computer programs.
7	Alternative Least-Squares Finite Element Models of Navier-Stokes Equations for Power-Law Fluids Vallala, Venkat 16 January 2010 (has links) The Navier-Stokes equations can be expressed in terms of the primary variables (e.g., velocities and pressure), secondary variables (velocity gradients, vorticity, stream function, stresses, etc.), or a combination of the two. The Least-Squares formulations of the original partial differential equations (PDE's) in terms of primary variables require C1 continuity of the finite element spaces across inter-element boundaries. This higherorder continuity requirement for PDE's in primary variables is a setback to Least-Squares formulation when compared to the weak form Galerkin formulation. To overcome this requirement, the PDE or PDE's are first transformed into an equivalent lower order system by introducing additional independent variables, sometimes termed auxiliary variables, and then formulating the Least-Squares model based on the equivalent lower order system. These additional variables can be selected to represent physically meaningful variables, e.g., fluxes, stresses or rotations, and can be directly approximated in the model. Using these auxiliary variables, different alternative Least-Squares finite element models are developed and investigated. In this research, the vorticity and stress based alternative Least-Squares finite element formulations of Navier-Stokes equations are developed and are verified with the benchmark problems. The Least-Squares formulations are developed for both the Newtonian and non-Newtonian fluids (based on the Power-Law model) and the effects of linearization before and after minimization are investigated using the benchmark problems. For the non-Newtonian fluids both the shear thinning and shear thickening fluids have been studied by varying the Power-Law index from 0.25 to 1.5. Also, the traditional weak form based penalty method is formulated for the non-Newtonian case and the results are compared with the Least-Squares formulation. The results matched with the benchmark problems for Newtonian and non- Newtonian fluids, irrespective of the formulation. There was no effect of linerization in the case of Newtonian fluids. However for non-Newtonian fluids, there was some tangible effect of linearization on the accuracy of the solution. The effect was more pronounced for lower power-law indices compared to higher power-law indices. And there seemed to have some kind of locking that caused the matrices to be ill-conditioned especially for lower values of power-law indices. Least-Squares, Power-Law
8	Least squares and adaptive multirate filtering / Hawes, Anthony H. January 2003 (has links) (PDF) Thesis (M.S. in Electrical Engineering)--Naval Postgraduate School, September 2003. / Thesis advisor(s): Charles W. Therrien, Roberto Cristi. Includes bibliographical references (p. 45). Also available online. Estimation theory. Least squares.
9	Some numerical computations in linear estimation Bhattacharya, Binay K. January 1978 (has links) No description available. Estimation theory. Least squares.
10	An empirical investigation of nonlinear least squares estimation with correlated errors Adelaar, Glenn A. 08 1900 (has links) No description available. Parameter estimation Least squares

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