Hierarchical dynamic mathematical structures (models) theory: monograph

Abstract

New mathematical elements were introduced: Dynamic operator, self-capacity, self-set, hierarchical dynamic structure, dynamic set, self-containment and mathematical apparatus for their use. All this was caused by the need to construct fundamentally new neural networks based on the principles of functioning of the central nervous system of living organisms. Our constructive approach to set theory differs from the construction of constructive sets by A.Mostowski: we construct completely different types of constructive sets. Here, the axiom of regularity (A8) is removed from the axioms of set theory, so we naturally obtain the possibility of using singularities in the form of self-sets, self-elements, which is exactly what we need for new mathematical models for describing complex processes. Our mathematics is unusual for a mathematician, because here the fulcrum is the action, and not the result of the action as in classical mathematics. Therefore, our mathematics is adapted not only to obtain results, but also to directly control actions, which will certainly show its benefits on a fundamentally new type of neural networks with directly parallel calculations, for which it was created. Any action has much greater potential than its result. Significance of the article: in a new qualitatively different approach to the study of complex processes through new mathematical hierarchical parallel dynamic structures, in particular those processes that are dealt with by Synergetics. Our approach is not based on deterministic equations that generate self-organization, which is very difficult to study and gives very small results for a very limited class of problems and does not provide the most important thing - the structure of self-organization. We are just starting from the assumed structure of self-organization, since we are interested not so much in the numerical calculation of this as in the structure of self-organization itself, its formation (construction) for the necessary purposes and its management. Although we are also interested in numerical calculations. Nobel laureates in physics 2023 Ferenc Kraus and his colleagues Pierre Agostini and Anna Lhuillier used a short-pulse laser to generate attosecond pulses of light to study the fuzzy dynamics of electrons in matter. According to our Theory of singularities of the type synthesizing, its action corresponds to singularity , which allows one to reach the upper level of subtle energies to manipulate lower levels. In April 2023, we proposed using a short-pulse laser to achieve the desired goals by a directly parallel neural network. We then proposed the fundamental development of this directly parallel neural network. The significance of our monograph is in the formation of the presumptive mathematical structure of subtle energies, this is being done for the first time in science, and the presumptive classification of the mathematical structures of subtle energies for the first time. The experiments of the 2022 Nobel laureates Asle Ahlen, John Clauser, Anton Zeilinger and the experiments in chemistry Nazhipa Valitov eloquently demonstrate that we are right and that these studies are necessary. Be that as it may, we created classes of new mathematical structures, new fuzzy mathematical singularities, i.e., made a contribution to the development of mathematics.

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^REVIEWER:

^{Volodymyr PASYNKOV - PhD of physic-mathematical science, assistant professor of applied mathematics and calculated techniques department of «National Metallurgical Academy», Ukraine.}

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CONTENTS:

Part I. Sit – elements and their applications
1 Sit – elements
1.1 Introduction
1.2 Sit – elements
1.3 Capacity in itself
1.4 Connection of Sit – elements with capacities in themselves
1.5 Math self
1.6 Operator it self
1.7 Lim-itself
1.8 About Sit and S3f programming
2 Dynamic Sit – elements
2.1 Dynamic Sit – elements
2.2 Dynamic containment of oneself
2.3 Connection of dynamic Sit – elements with dynamic containment of oneself
2.4 Dynamic math itself
2.5 About dynamic Sit and S3 f(t) programming
3 Sit – elements for continual sets
3.1 Sit – elements for continual sets
3.2 The connection of continual Sit – elements with continual self-capacities in themselves as an element
3.3 Mathematics itself for continual elements
4 Dynamic continual Sit – elements
4.1 Dynamic continual Sit – elements
4.2 Dynamic continual containment of oneself in oneself as an element
4.3 The connection of dynamic continual Sit – elements with dynamic containment of oneself in oneself as an element
4.4 Dynamic continual mathematics itself
4.5 Connection of dynamic continual Sit – elements with targetweights with dynamic continual containment of oneself with target weights
5 The usage of Sit-elements for networks
5.1 The usage of Sit-elements for networks
Appendix
References

Part II. Classes of other structural elements based on St.
A   tS - elements and their modifications
A.1 tS –elements
A.2 tS1– elements
A.3 tS2– elements
B   Se – elements and their modifications
B.1 Se – elements
B.2 S1e – elements
B.3 S2e – elements
C   Set – elements and their modifications
C.1 Set – elements
C.1.1 Set – elements
C.1.2 Some applications of Set to neuroscience
C.1.3 The usage of Set-element for networks
C.2 S1et – elements
C.3 Set1 – elements
C.4 S2et – elements
References

Part III. Variable hierarchical dynamical structures (models) for dynamic, singular, hierarchical sets and the problem of cold thermonuclear fusion. Program operators SIT, tS, S1e, Set1.
D   Variable hierarchical dynamical structures (models) for dynamic singular, hierarchical sets and the problem of cold thermonuclear fusion
E   Program operators SIT, tS, S1e, Set1
References

Part IV. Fuzzy Sit – elements and their applications
1 Introduction
2 Fuzzy Sit – elements
3 Dynamic fuzzy Sit – elements
4 Continual fuzzy Sit – elements
5 Dynamic continual fuzzy Sit – elements
6 The usage of fSit-elements for networks
Appendix
References

Supplement 1: Connection Sit – elements with usual functionals and operators
Supplement 2: S2t-elements
Conclusions
References

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^{Year of publication: 2024
Language: English
Authors: Danilishyn I., Danilishyn O.
Translation: No
Translator: -}

^{Type: E-book
Number of pages: 272
Format: PDF (7 MB)
ISBN: 979-8-89217-809-9
UDC: 004:51(07)}

References

1. Thomas J.Jech. LECTURES IN SET THEORY WITH PARTICULAR EMPHASIS ON THE METHOD OF FORCING. SPRINGER-VERLAG Berlin. Heidelberg. New-York, 1971.
2. Danilishyn, I., Danilishyn, O., & Pasynkov, V. (2023). THE USAGE OF SIT-ELEMENTS FOR NETWORKS. Collection of scientific papers «ΛΌГOΣ», (March 31, 2023; Zurich, Switzerland), 129-134. https://doi.org/10.36074/logos-31.03.2023.38
3. Danilishyn, I., Danilishyn, O., & Pasynkov, V. (2023). MATHEMATICS ST, PROGRAMMING OPERATORS ST AND SOME EMPLOYMENT. Collection of scientific papers «SCIENTIA», (March 10, 2023; Valencia, Spain), 123-127. https://previous.scientia.report/index.php/archive/article/view/792
4. Danilishyn I., Danilishyn O. DYNAMIC SETS THEORY: SIT-ELEMENTS AND THEIR APPLICATIONS. Preprint. Research Square. 2023-08-01 https://doi.org/10.21203/rs.3.rs-3217178/v1
5. Dynamic Sets Theory: Sit-elements and Their Applications | Research Square www.researchsquare.com/article/rs-3217178/v1
6. Danilishyn, I., Danilishyn, O., & Pasynkov, V. (2023). DYNAMICAL SIT-ELEMENTS. Collection of scientific papers «ΛΌГOΣ», (March 31, 2023; Zurich, Switzerland), 116-118. https://doi.org/10.36074/logos-31.03.2023.34
7. Krain S.G. Linear differential equations in Banach space. M., Science, 1967 (in Russian).
8. A.L.Dontchev .Perturbations, approximations and sensitivity analysis of optimal control systems. Sptinger-Verllag, Berlin, New York,1983.
9. Galushkin A. Networks: principles of the theory. Hot line-Telecom. M.,2010 (in Russian).
10. D.I.Blokhintsev. Quantum Mechanics Lectures on Selected Topics. Moscow, Atomizdat,1981.
11. I. Danilishyn, O. Danilishyn Program Operators Sit, tS, S1e, Set1. Journal of Sensor Networks and Data Communications [ISSN: 2994-6433] 2023, Volume 3 | Issue 1 | 138-143, https://www.opastpublishers.com/tablecontents/jsndc-volume-3-issue-1-year-2023
12. Danilishyn, I. ., & Danilishyn, O. . (2023). tS – ELEMENTS. Collection of Scientific Papers «ΛΌГOΣ», (June 23, 2023; Oxford, UK), 156–161. https://doi.org/10.36074/logos-23.06.2023.42
13. Danilishyn , I., Danilishyn , O., & Pasynkov , V. (2023). SET1 - ELEMENTS. Grail of Science, (28), 239–254. https://doi.org/10.36074/grail-of-science.09.06.2023.38
14. Danilishyn, I. ., & Danilishyn, O. . (2023). VARIABLE HIERARCHICAL DYNAMICAL STRUCTURES (MODELS) FOR DYNAMIC, SINGULAR, HIERARCHICAL SETS AND THE PROBLEM OF COLD THERMONUCLEAR FUSION. Collection of Scientific Papers «SCIENTIA», (July 14, 2023; Coventry, UK), 113–119. Retrieved from https://previous.scientia.report/index.php/archive/article/view/1089
15. Danilishyn , I., Danilishyn, O., & Pasynkov , V. (2023). SOME APPLICATIONS OF SIT- ELEMENTS TO SETS THEORY AND OTHERS. Collection of Scientific Papers «ΛΌГOΣ», (May 26, 2023; Boston, USA), 166–171. https://doi.org/10.36074/logos-26.05.2023.044
16. Danilishyn .V. Danilishyn O.V. SOME APPLICATIONS OF SITELEMENTS TO CONTINUALVALUED LOGIC AND OTHERS. Features of the development of modern science in the pandemic’s era: a collection of scientific papers «SCIENTIA» with Proceedings of the IV International Scientific and Theoretical Conference, May 19, 2023. Berlin, Federal Republic of Germany: European Scientific Platform, pp.79-84. https://previous.scientia.report/index.php/archive/issue/view/19.05.2023
17. Danilishyn I., Danilishyn O. Dynamic Sets Set and Some of Their Applications to Neuroscience, Networks Set New Advances in Brain & Critical Care 2023, Volume 4 | Issue 2 | 66- 81. https://doi.org/10.33140/NABCC.04.02.02
18. Oleksandr Danilishyn and Illia Danilishyn. Dynamic Sets S1et and Some of their Applications in Physics. Science Set Journal of Physics, 25 September 2023,1-11, 815-_ article1695707465.pdf (mkscienceset.com)
19. I. Danilishyn, O. Danilishyn Dynamic Sets Se, Networks Se. Advances in Neurology and Neuroscience, 2023, Volume 6 | Issue 2 | 278-294. https: //www.opastpublishers.com/open-access-articles/dynamic-sets-senetworks-se.pdf
20. I. Danilishyn, O. Danilishyn Program Operators Sit, tS, S1e, Set1. Journal of Sensor Networks and Data Communications [ISSN: 2994-6433] 2023, Volume 3 | Issue 1 | 138-143, https://www.opastpublishers.com/tablecontents/jsndc-volume-3-issue-1-year-2023
21. Danilishyn , I., Danilishyn , O., & Pasynkov , V. (2023). THE INTRODUCTORY CONCEPTS AND OPERATIONS OF ST MATHEMATICS. Grail of Science, (24), 403–406. https://doi.org/10.36074/grail-of-science.17.02.2023.073
22. Danilishyn I., Danilishyn O. Dynamic Sets Set and Some of Their Applications to Neuroscience, Networks Set New Advances in Brain & Critical Care 2023, Volume 4 | Issue 2 | 66- 81. https://doi.org/10.33140/NABCC.04.02.02
23. I. Danilishyn, O. Danilishyn Dynamic Sets Se, Networks Se. Advances in Neurology and Neuroscience, 2023, Volume 6 | Issue 2 | 278-294. https: //www.opastpublishers.com/open-access-articles/dynamic-sets-senetworks-se.pdf
24. Danilishyn .V. Danilishyn O.V. SIT-DYNAMICAL AND CONTINUAL ELEMENTS. MATERIALS OF THE VIII INTERNATIONAL PRIORITY SCIENTIFIC AND PRACTICAL CONFERENCE DIRECTIONS OF RESEARCH IN SCIENTIFIC AND EDUCATIONAL ACTIVITIES April 29 - 30 Lviv in 2023 , pp.24-31. http://lviv-forum.inf.ua/save/2023/29-30.04
25. Danilishyn , I., Danilishyn , O., & Pasynkov , V. (2023). CONTINUAL SIT-ELEMENTS WITH TARGET WEIGHTS. Матеріали конференцій МНЛ, (21 квітня 2023 р., м. Ужгород), 105–107. Вилучено з https://archive.liga.science/index.php/conference-proceedings/article/view/316
26. Danilishyn , I., Danilishyn , O., & Pasynkov , V. (2023). SIT-ELEMENTS AND DYNAMICAL SIT-ELEMENTS FOR CONTINUAL SETS. Collection of Scientific Papers «SCIENTIA», (April 14, 2023; Bern, Switzerland), 61–66. Retrieved from https://previous.scientia.report/index.php/archive/article/view/886
27. Danilishyn .V. Danilishyn O.V. SIT-ELEMENTS AND THEIR APPLICATIONS. LVIV SCIENTIFIC FORUM MATERIALS OF THE VIII INTERNATIONAL SCIENTIFIC AND PRACTICAL CONFERENCE THEORY AND PRACTICE OF MODERN SCIENCE AND EDUCATION March 19-20, 2023, Lviv, pp.33-38. http://lviv-forum.inf.ua/save/2023/29-30.04/
28. Danilishyn .V. Danilishyn O.V. SIT-NETWORKS. Lviv SCIENTIFIC FORUM MATERIALS OF THE VIII INTERNATIONAL SCIENTIFIC AND PRACTICAL CONFERENCE THEORY AND THE PRACTICE OF MODERN SCIENCE AND EDUCATION March 19–20, 2023 Lviv, pp.39- 41. http://lviv-forum.inf.ua/save/2023/29-30.04/
29. Danilishyn .V. Danilishyn O.V. MATHEMATICS ST, PROGRAMMING OPERATORS STAND SOME EMPLOYMENT comprehensive approach to the modernization of science: methods, models, and multidisciplinarity: materials of the II International scientific conference, Lutsk, March 3, 2023. / International Center scientific research. - Vinnytsia: European Scientific Platform, 2023,p.p. 114-119. https://archive.mcnd.org.ua/index.php/conference-proceeding/issue/view/03.03.2023
30. Danilishyn, I., Danilishyn , O., & Pasynkov , V. (2023). ST – ELEMENTS APPLICATIONS FOR SOME TASKS. Grail of Science, (24), 400–402. https://doi.org/10.36074/grail-of-science.17.02.2023.072
31. Danilishyn .V. Danilishyn O.V. SOME St – ELEMENTS APPLICATIONS. Information society: technological, economic and technical aspects formation (issue 74): materials of the International Scientific Internet conferences (Ternopil, Ukraine – Perevorsk, Poland, February 6-7, 2023) / [ editor. : O. Patryak and others ] ; GO “Naukova community”; WSSG in Przeworsk. - Ternopil. http://www.konferenciaonline.org.ua/ua/article/id-947/
32. Danilishyn .V. St – ELEMENTS AND PROGRAMMING OPERATORS. Informational society: technological, economic and technical aspects of formation (issue 74): materials of the International Scientific Internet Conference, (m. Ternopil, Ukraine – Perevorsk, Poland, March 6-7, 2023) / [ editor. : O. Patryak and others ] ; NGO “Scientific community”; WSSG w Przeworska. – Ternopil, pp.9-12. The Internet address of the article on web-site: http://www.konferenciaonline.org.ua/ua/article/id-917
33. Danilishyn I., Danilishyn O. PROGRAM OPERATORS SIT, tS, S1e, Set1. Preprint. Research Square. : 2023-08-04 08:00:27 https://www.researchsquare.com/article/rs-3228799/v1 https://doi.org/10.21203/rs.3.rs-3228799/v1
34. AND THEIR APPLICATIONS. Preprint. Research Square.METHOD ARTICLE published 2023-08-01 04:20:16 https://doi.org/10.21203/rs.3.rs-3217178/v1
35. Krain S.G. Linear differential equations in Banach space. M., Science, 1967 (in Russian).
36. Kantor G. Fundamentals of the general doctrine of diversity. New ideas in mathematics, 6,1914 (in Russian).
37. N.Y. Belenkov. The principle of the integrity of brain activity. M., Meditsina, 1980 (in Russian).
38. A.L.Dontchev .Perturbations, approximations and sensitivity analysis of optimal control systems. Sptinger-Verllag, Berlin, New York, 1983.
39. Galushkin A. Networks: principles of the theory. Hot line-Telecom. M.,2010 (in Russian).
40. Thomas J.Jech. LECTURES IN SET THEORY WITH PARTICULAR EMPHASIS ON THE METHOD OF FORCING. SPRINGER-VERLAG Berlin. Heidelberg. New York, 1971.
41. D.I.Blokhintsev. Quantum Mechanics Lectures on Selected Topics. Moscow, Atomizdat, 1981.
42. George J. Klir, Bo Yuan. Fuzzy sets and fuzzy logic: theory and applications / Prentice Hall P T R Upper Saddle River, New Jersey 07458. 1995
43. Guanrong Chen, Trung Tat Pham. Introduction to fuzzy sets, fuzzy logic, and fuzzy control systems / CRC Press LLC Boca Raton London New York Washington, D.C. 2001
44. Ershov Y.L. On a Hierarchy of Sets I, Albebra and Logic, 7 (1968), 47 - 73.
45. Ershov Y.L. On a Hierarchy of Sets II, Albebra and Logic, 7 (1968),15 - 47.
46. Yrshov Y.L.On a Hierarchy of Sets III, Algebra and Logic, 9(1970), 34 - 51.
47. Oleksandr Danilishyn, Illia Danilishyn. Dynamical Sets Theory: S2t-Elements and Their Applications. J Math Techniques Comput Math, 2(12), 2023, 479-498. https://www.opastpublishers.com/open-accessarticles/dynamical-sets-theory-s2telements-and-their-applications.pdf
48. A.Mostowski. Constructive sets.UNIVERSITY OF WARSAW-North-Holland Publishing Company-Amsterdam. PWN-Polish Scientific Publishers-Warszawa.1969.