Please use this identifier to cite or link to this item: http://repositsc.nuczu.edu.ua/handle/123456789/11062
Title: DEVELOPMENT OF A SELF-ADJUSTING METHOD FOR CALCULATING RECURRENT DIAGRAMS IN A SPACE WITH A SCALAR PRODUCT
Authors: Boris Pospelov
Ruslan Meleshchenko
Vitalii Asotskyi
Olena Petukhova
Stella Gornostal
Serhii Harbuz
Keywords: metric-threshold uncertainty, recurrence diagram, self-adjusting method, metric, metric space, scalar product of vectors.
Issue Date: 2019
Publisher: «EUREKA: Physics and Engineering» Number 5
Citation: PUBLISHER OÜ «Scientific Route» European Union Editorial office «EUREKA: Physical Sciences and Engineering»
Abstract: A self-adjusting method for calculating recurrence diagrams has been developed. The proposed method is aimed at overcoming the metric-threshold uncertainty inherent in the known methods for calculating recurrence diagrams. The method provides invariance to the nature of the measured data, and also allows to display the recurrence of states, adequate to real systems of various fields. A new scientific result consists in the theoretical justification of the method for calculating recurrence diagrams, which is capable of overcoming the existing metric-threshold uncertainty of known methods on the basis of self-adjusting by measurements by improving the topology of the metric space. The topology is improved due to the additional introduction of the scalar product of state vectors into the operation space. This allowed to develop a self-adjusting method for calculating recurrence diagrams with increased accuracy and adequacy of the display of recurrence states of real systems. Moreover, the method has a relatively low computational complexity, providing invariance with respect to the nature of the irregularity of measurements.
URI: http://repositsc.nuczu.edu.ua/handle/123456789/11062
ISSN: DOI: 10.21303/2461-4262.2019.00981
Appears in Collections:Кафедра пожежної і техногенної безпеки об'єктів та технологій

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