Original scientific paper
https://doi.org/10.17535/crorr.2016.0018
Preponderantly increasing/decreasing data in regression analysis
Darija Marković
orcid.org/0000-0002-6688-0077
; Department of Mathematics, J. J. Strossmayer University of Osijek, Trg Ljudevita Gaja 6, 31000 Osijek, Croatia
Abstract
For the given data (wI, xI, yI ), i = 1, . . . , n, and the given model function f (x; θ), where θ is a vector of unknown parameters, the goal of regression analysis is to obtain estimator θ∗ of the unknown parameters θ such that the vector of residuals is minimized in some sense. The common approach to this problem of minimization is the least-squares method, that is minimizing the L2 norm of the vector of residuals. For nonlinear model functions, what is necessary is finding at least the sufficient conditions on the data that will guarantee the existence of the best least-squares estimator. In this paper we will describe and examine in detail the property of preponderant increase/decrease of the data, which ensures the existence of the best estimator for certain important nonlinear model functions.
Keywords
regression analysis; nonlinear least squares; existence problem; preponderant increase/decrease property; Chebyshev inequality
Hrčak ID:
174206
URI
Publication date:
30.12.2016.
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