| DC Field | Value | Language |
|---|
| dc.contributor.author | Наконечний, О. | |
| dc.contributor.author | Зінько, П. | |
| dc.contributor.author | Шевчук, Ю. | |
| dc.contributor.author | Nakonechnyi, O. | |
| dc.contributor.author | Zinko, P. | |
| dc.contributor.author | Shevchuk, I. | |
| dc.date.accessioned | 2020-02-27T09:45:15Z | - |
| dc.date.available | 2020-02-27T09:45:15Z | - |
| dc.date.created | 2019-02-26 | |
| dc.date.issued | 2019-02-26 | |
| dc.identifier.citation | Nakonechnyi O. Guaranteed predictive estimation of solutions of system of differential equations with the Gompertzian dynamics / O. Nakonechnyi, P. Zinko, I. Shevchuk // Mathematical Modeling and Computing. — Lviv : Lviv Politechnic Publishing House, 2019. — Vol 6. — No 1. — P. 92–100. | |
| dc.identifier.uri | https://ena.lpnu.ua/handle/ntb/46144 | - |
| dc.description.abstract | У роботі досліджено математичну модель у формі системи нелінійних
диференціальних рівнянь із динамікою Гомперца, яка може бути застосована для моделювання
процесів, що швидко зростають за часом. Сформульовано та розв’язано задачу
знаходження гарантованих прогнозних оцінок для систем диференціальних рівнянь з
динамікою Гомперца для випадку неперервних спостережень. Як приклади подано
результати визначення гарантованих прогнозних оцінок динаміки математичної
моделі поширення одного виду інформації в соціумі. | |
| dc.description.abstract | In this paper, we have introduced a mathematical model to describe processes that grow in
time rapidly. The model has the form of a system of non-linear differential equations with
Gompertzian dynamics and non-stationary parameters. We have formulated and studied
the problem of finding the predictive estimation for the systems of differential equations
with Gompertzian dynamics, for the case of continuous observation. We have suggested
the algorithms for building guaranteed predictive estimations for the model. We have
presented as an example, the results of numerical experiments to build guaranteed estimates
for the mathematical model of spreading some type of information in society. The
suggested approach presents both theoretical interest and important practical meaning. | |
| dc.format.extent | 92-100 | |
| dc.language.iso | en | |
| dc.publisher | Lviv Politechnic Publishing House | |
| dc.relation.ispartof | Mathematical Modeling and Computing, 1 (6), 2019 | |
| dc.subject | системи нелінійних диференціальних рівнянь | |
| dc.subject | динаміка Гомперца | |
| dc.subject | прогнозні гарантовані оцінки | |
| dc.subject | невизначеність | |
| dc.subject | system of differential non-linear equations | |
| dc.subject | Gompertzian dynamics | |
| dc.subject | guaranteed predictive estimation | |
| dc.subject | uncertainty | |
| dc.title | Guaranteed predictive estimation of solutions of system of differential equations with the Gompertzian dynamics | |
| dc.title.alternative | Гарантовані прогнозні оцінки розв‘язків систем диференціальних рівнянь із динамікою Гомперца | |
| dc.type | Article | |
| dc.rights.holder | CMM IAPMM NAS | |
| dc.rights.holder | © 2019 Lviv Polytechnic National University | |
| dc.contributor.affiliation | Київський національний університет імені Тараса Шевченка | |
| dc.contributor.affiliation | Taras Shevchenko National University of Kyiv | |
| dc.format.pages | 9 | |
| dc.identifier.citationen | Nakonechnyi O. Guaranteed predictive estimation of solutions of system of differential equations with the Gompertzian dynamics / O. Nakonechnyi, P. Zinko, I. Shevchuk // Mathematical Modeling and Computing. — Lviv : Lviv Politechnic Publishing House, 2019. — Vol 6. — No 1. — P. 92–100. | |
| dc.relation.references | 1. Kalas J., Novotny J., Michalek J., NakonechnyiO.G. Mathematical model for cancer prevalence and cancer mortality. Taurida Journal of Computer Science Theory and Mathematics. 2, 44–54 (2013). | |
| dc.relation.references | 2. NakonechnyiO.G., Zinko P.M. Confrontation problems with the dynamics Gompertzian systems. Journal of Computational and Applied Mathematics. 3 (120), 50–60 (2015), (in Ukrainian). | |
| dc.relation.references | 3. NakonechnyiO.G. Parameters estimation under uncertainty. Scientific notes of National University of Kyiv, Faculty of Cybernetics. VII, 102–111 (2004), (in Ukrainian). | |
| dc.relation.references | 4. NakonechnyiO.G. Problem of guaranteed estimation of parameters in dynamics. Abstracts XVII International Conference “Problem of decision making under uncertainties”. Shidnycya, Ukraine. May 23–27. P. 141 (2011), (in Ukrainian). | |
| dc.relation.references | 5. NakonechnyiO.G., Zinko P.M., Shevchuk I.M. Predictive estimation of mathematical models of information spreading process under uncertainty. System Research and Information Technologies. 4, 54–65 (2017), (in Ukrainian). | |
| dc.relation.references | 6. NakonechnyiO.G., Shevchuk I.M., ChicriiV.K. Estimation of non-stationary parameters of differential equations under uncertainty. Cybernetics and system analysis. 4, 109–121 (2018), (in Ukrainian). | |
| dc.relation.references | 7. NakonechnyiO.G., Zinko P.M., Shevchuk I.M. Guaranteed estimation of non-stationary parameters of difference equations under uncertainty. Journal of Automation and Information Sciences. 6, 41–54 (2018), (in Russian). | |
| dc.relation.references | 8. NakonechnyiO.G. Problem of guaranteed estimation of parameters in dynamics. Abstracts XXXIII International Conference “Problem of decision making under uncertainties”. Hurgada, Egypt. Jauare 24 – February 1. P. 64–66 (2019). | |
| dc.relation.references | 9. BublikB.N., DanilovV.Y., NakonechnyiO.G. Some observation and control problems in linear systems. Kyiv, UMK VO (1988), (in Russian). | |
| dc.relation.references | 10. MikhailovA.P., MarevtsevaN.A. Models of Information Warfare. Mathematical Models and Computer Simulations. 4 (3), 251–259 (2012). | |
| dc.relation.references | 11. MishraB.K., PrajapatiA. Modelling and simulation: cyber war. Procedia Technology. 10, 987–997 (2013). | |
| dc.relation.references | 12. KereselidzeN.G. An optimal control problem in mathematical and computer models of the information warfare. Differential and Difference Equations with Applications: ICDDEA, Amadora, Portugal, May 2015, Selected Contributions. Springer Proceedings in Mathematics and Statistics, 164. Springer International Publishing Switzerland. P. 303–311 (2015). | |
| dc.relation.references | 13. NakonechnyiO.G., Shevchuk I.M. Mathematical model of information spreading process with nonstationary parameters. Bulletin of Taras Shevchenko National University of Kiev. Series Physics and Mathematics. 3, 98–105 (2016), (in Ukrainian). | |
| dc.relation.references | 14. IvokhinE.V., Adzhubey L.T., Gavrylenko E.V. Guaranteed estimation of non-stationary parameters of difference equations under uncertainty. Journal of Automation and Information Sciences. 1, 5–12 (2019), (in Russian). | |
| dc.relation.referencesen | 1. Kalas J., Novotny J., Michalek J., NakonechnyiO.G. Mathematical model for cancer prevalence and cancer mortality. Taurida Journal of Computer Science Theory and Mathematics. 2, 44–54 (2013). | |
| dc.relation.referencesen | 2. NakonechnyiO.G., Zinko P.M. Confrontation problems with the dynamics Gompertzian systems. Journal of Computational and Applied Mathematics. 3 (120), 50–60 (2015), (in Ukrainian). | |
| dc.relation.referencesen | 3. NakonechnyiO.G. Parameters estimation under uncertainty. Scientific notes of National University of Kyiv, Faculty of Cybernetics. VII, 102–111 (2004), (in Ukrainian). | |
| dc.relation.referencesen | 4. NakonechnyiO.G. Problem of guaranteed estimation of parameters in dynamics. Abstracts XVII International Conference "Problem of decision making under uncertainties". Shidnycya, Ukraine. May 23–27. P. 141 (2011), (in Ukrainian). | |
| dc.relation.referencesen | 5. NakonechnyiO.G., Zinko P.M., Shevchuk I.M. Predictive estimation of mathematical models of information spreading process under uncertainty. System Research and Information Technologies. 4, 54–65 (2017), (in Ukrainian). | |
| dc.relation.referencesen | 6. NakonechnyiO.G., Shevchuk I.M., ChicriiV.K. Estimation of non-stationary parameters of differential equations under uncertainty. Cybernetics and system analysis. 4, 109–121 (2018), (in Ukrainian). | |
| dc.relation.referencesen | 7. NakonechnyiO.G., Zinko P.M., Shevchuk I.M. Guaranteed estimation of non-stationary parameters of difference equations under uncertainty. Journal of Automation and Information Sciences. 6, 41–54 (2018), (in Russian). | |
| dc.relation.referencesen | 8. NakonechnyiO.G. Problem of guaranteed estimation of parameters in dynamics. Abstracts XXXIII International Conference "Problem of decision making under uncertainties". Hurgada, Egypt. Jauare 24 – February 1. P. 64–66 (2019). | |
| dc.relation.referencesen | 9. BublikB.N., DanilovV.Y., NakonechnyiO.G. Some observation and control problems in linear systems. Kyiv, UMK VO (1988), (in Russian). | |
| dc.relation.referencesen | 10. MikhailovA.P., MarevtsevaN.A. Models of Information Warfare. Mathematical Models and Computer Simulations. 4 (3), 251–259 (2012). | |
| dc.relation.referencesen | 11. MishraB.K., PrajapatiA. Modelling and simulation: cyber war. Procedia Technology. 10, 987–997 (2013). | |
| dc.relation.referencesen | 12. KereselidzeN.G. An optimal control problem in mathematical and computer models of the information warfare. Differential and Difference Equations with Applications: ICDDEA, Amadora, Portugal, May 2015, Selected Contributions. Springer Proceedings in Mathematics and Statistics, 164. Springer International Publishing Switzerland. P. 303–311 (2015). | |
| dc.relation.referencesen | 13. NakonechnyiO.G., Shevchuk I.M. Mathematical model of information spreading process with nonstationary parameters. Bulletin of Taras Shevchenko National University of Kiev. Series Physics and Mathematics. 3, 98–105 (2016), (in Ukrainian). | |
| dc.relation.referencesen | 14. IvokhinE.V., Adzhubey L.T., Gavrylenko E.V. Guaranteed estimation of non-stationary parameters of difference equations under uncertainty. Journal of Automation and Information Sciences. 1, 5–12 (2019), (in Russian). | |
| dc.citation.issue | 1 | |
| dc.citation.spage | 92 | |
| dc.citation.epage | 100 | |
| dc.coverage.placename | Львів | |
| dc.coverage.placename | Lviv | |
| dc.subject.udc | 517.9 | |
| dc.subject.udc | 519.87 | |
| Appears in Collections: | Mathematical Modeling And Computing. – 2019. – Vol. 6, No. 1
|
