Work place: Department of Computer Science and Technology, Kyiv National University of Technologies and Design, Kyiv, 01011, Ukraine
E-mail: melnik.gv@knutd.com.ua
Website:
Research Interests: Computational Mathematics, Data Structures and Algorithms, Analysis of Algorithms, Combinatorial Optimization, Theory of Computation
Biography
Gennady V. Melnik, was born in Kiev, Ukraine, in 1986.
Candidate of Technical Sciences, since 2018, Associate Professor of the Department of Computer Science and Technology, Kiev National University of Technology and Design (KNUTD).
He is the author of more than 45 publications, including 10 copyright certificates and patents of Ukraine, 3 textbooks, 1 monograph.
Research interests: theoretical justification and software implementation of the computational scheme of the sequential optimization algorithm, which minimizes searches in the options tree; spatial problem of optimizing the form of threading during the synthesis of the feeding system on circular knitting machines for the case of obstacles in the form of vertical lines and circles.
By Vladimir Y. Shcherban Ganna A. Korogod Oksana Z. Kolysko Mariana I. Sholudko Gennady V. Melnik Vitaliy V. Chaban Yury Y. Shcherban
DOI: https://doi.org/10.5815/ijisa.2020.01.03, Pub. Date: 8 Feb. 2020
This article demonstrates the implementation of the proposed algorithm for computer modeling of redundant measurement methods to solve problems to improve the accuracy of measurements of a controlled quantity with a nonlinear and unstable transformation function. Improving accuracy is achieved by processing the results of redundant measurements which are an array of data according to the proposed measurement equations. In addition, the article presents the possibility of determining the time variation of the parameters of the transformation function. A comparative analysis of the results of computer simulation of redundant and direct methods with unstable parameters of the linear and nonlinear sensor transformation functions is carried out. It was proved that, in the case of an increase in deviations of the parameters of the transformation function from the nominal values, the use of redundant methods provides a significantly higher measurement accuracy compared to direct methods. This became possible due to the automatic elimination of the systematic component of the error of the measurement result due to a change in the parameters of the transformation function under the influence of destabilizing factors. It was also found that, in contrast to direct methods, methods of redundant measurements allow working with a nonlinear transformation function without additional linearization or dividing it into linear sections, which also contributes to increased accuracy.
In general, the application of the proposed approach in the modeling system proves its effectiveness and feasibility.
Thus, there is reason to argue about the prospects of redundant measurements in the field of improving accuracy with a nonlinear and unstable transformation function, as well as the possibility of identifying deviations of the parameters of the transformation function from their nominal values.
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