Solving a Paraboloidally Constrained Quadratic Programming Using Parabola-Quadratic Programming

Ismail Mohd

doi:10.11113/matematika.v28.n.318

Solving a Paraboloidally Constrained Quadratic Programming Using Parabola-Quadratic Programming

Authors

Ismail Mohd

DOI:

https://doi.org/10.11113/matematika.v28.n.318

Abstract

In this paper, we discuss the state-of-the-art models in estimating, evaluating, and selecting among non-linear mathematical models for obtaining the optimal solution of the optimization problems which involve the nonlinear functions in their constraints. We review theoretical and empirical issues including Newton's method, linear programming, quadratic programming, quadratically constrained programming, parabola, circle and the relation between parabola and circle. Finally, we outline our method called parabola-quadratic programming which is useful for solving economic forecasting and financial time-series with non-linear models. Keywords: Parabola; Circle; Quadratic; Optimization; Algorithm. 2010 Mathematics Subject Classification: 90C30

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01-06-2012

How to Cite

Mohd, I. (2012). Solving a Paraboloidally Constrained Quadratic Programming Using Parabola-Quadratic Programming. MATEMATIKA, 28, 87–108. https://doi.org/10.11113/matematika.v28.n.318

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Volume 28 (June 2012)

Section

Mathematics

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Copyright of articles that appear in MATEMATIKA: MJIAM belongs exclusively to Penerbit UTM Press, Universiti Teknologi Malaysia. This copyright covers the rights to reproduce the article, including reprints, electronic reproductions or any other reproductions of similar nature.

Solving a Paraboloidally Constrained Quadratic Programming Using Parabola-Quadratic Programming

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