KOLMOGOROV-WIENER FILTER FOR CONTINUOUS TRAFFIC PREDICTION IN THE GFSD MODEL

IF 0.3 Q4 COMPUTER SCIENCE, HARDWARE & ARCHITECTURE

Radio Electronics Computer Science Control Pub Date : 2022-10-01 DOI:10.15588/1607-3274-2022-3-3

V. Gorev, A. Gusev, V. Korniienko

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引用次数: 1

Abstract

Context. We investigate the Kolmogorov-Wiener filter weight function for the prediction of continuous stationary telecommunication traffic in the GFSD (Gaussian fractional sum-difference) model. Objective. The aim of the work is to obtain an approximate solution for the corresponding weight function and to illustrate the convergence of the truncated polynomial expansion method used in this paper. Method. The truncated polynomial expansion method is used for the obtaining of an approximate solution for the KolmogorovWiener weight function under consideration. In this paper we used the corresponding method on the basis of the Chebyshev polynomials of the first kind orthogonal on the time interval on which the filter input data are given. It is expected that the results based on other polynomial sets will be similar to the results obtained in this paper. Results. The weight function is investigated in the approximations up to the eighteen-polynomial one. It is shown that approximations of rather large numbers of polynomials lead to a good coincidence of the left-hand side and the right-hand side of the Wiener-Hopf integral equation. The quality of the coincidence is illustrated by the calculation of the corresponding MAPE errors. Conclusions. The paper is devoted to the theoretical construction of the Kolmogorov-Wiener filter for the prediction of continuous stationary telecommunication traffic in the GFSD model. The traffic correlation function in the framework of the GFSD model is a positively defined one, which guarantees the convergence of the truncated polynomial expansion method. The corresponding weight function is obtained in the approximations up to the eighteen-polynomial one. The convergence of the method is illustrated by the calculation of the MAPE errors of misalignment of the left-hand side and the right-hand side of the Wiener-Hopf integral equation under consideration. The results of the paper may be applied to practical traffic prediction in telecommunication systems with data packet transfer.

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GFSD模型中连续交通预测的Kolmogorov-wiener滤波器

上下文。我们研究了高斯分数阶和差模型中用于预测连续平稳通信流量的Kolmogorov-Wiener滤波权函数。目标。本文的目的是得到相应权函数的近似解，并说明本文所使用的截断多项式展开方法的收敛性。方法。利用截断多项式展开法求出所考虑的KolmogorovWiener权函数的近似解。本文利用第一类切比雪夫多项式在给定滤波器输入数据的时间区间上的正交，给出了相应的方法。期望基于其他多项式集的结果与本文的结果相似。结果。对权函数进行了直到18次多项式的近似研究。结果表明，对相当多的多项式进行近似，可以使维纳-霍普夫积分方程的左边和右边很好地重合。通过计算相应的MAPE误差来说明重合的质量。结论。本文研究了在GFSD模型中预测连续固定通信流量的Kolmogorov-Wiener滤波器的理论构造。GFSD模型框架下的交通相关函数是一个正定义函数，保证了截断多项式展开方法的收敛性。相应的权函数在逼近到18次多项式时得到。通过计算所考虑的Wiener-Hopf积分方程的左右两侧不对准的MAPE误差，说明了该方法的收敛性。本文的研究结果可用于具有数据包传输的通信系统的实际流量预测。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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来源期刊

Radio Electronics Computer Science Control COMPUTER SCIENCE, HARDWARE & ARCHITECTURE-

自引率

20.00%

发文量

审稿时长

12 weeks