State estimation of discrete measurements for the mathematical model described by differential equations hyperbolic type

Authors

  • Paweł KRUTYS Uniwersytet Rzeszowski, Polska
  • Tadeusz KWATER Uniwersytet Rzeszowski, Polska
  • Ewa ŻESŁAWSKA Uniwersytet Rzeszowski, Polska
  • Robert PĘKALA Uniwersytet Rzeszowski, Polska

Keywords:

mathematical modeling, partial differential equations, estimation, simulation experiments

Abstract

This paper presents a mathematical model of a polluted river described differential equations of hyperbolic type, and consider estimation using the filter Kalman-Bucy with discrete measurements. As a result, it received two steps of etimation i.e. filtration and prediction. In the estimation process of river quality was used measurements of the fixed point, yielding discrete values, which then was crucial to issue a prediction understood as a continuous equation with the initial conditions obtained by a filtration process to generate the predicted values of subsequent measurements. The study included the selection of appropriate filter gain factors having a major influence on the estimation error.

Published

2014-06-30

How to Cite

KRUTYS, P., KWATER, T., ŻESŁAWSKA, E., & PĘKALA, R. (2014). State estimation of discrete measurements for the mathematical model described by differential equations hyperbolic type. Journal of Education, Technology and Computer Science, 9(1), 605–610. Retrieved from https://journals.ur.edu.pl/jetacomps/article/view/6721

Issue

Section

THE FUNDAMENTALS OF TECHNOLOGY EDUCATION

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