Параметри
Stochastic models in artificial intelligence development
Тип публікації :
Стаття
Дата випуску :
2021
Автор(и) :
Кириченко, Оксана Л.
Малик, Ігор В.
Остапов, Сергій Е.
Мова основного тексту :
English
eKNUTSHIR URL :
Випуск :
2
ISSN :
1812-5409
Початкова сторінка :
53
Кінцева сторінка :
57
Цитування :
Кириченко, О. Л., Малик, І. В., Остапов, С. Е. (2021). Stochastic models in artificial intelligence development. Bulletin of Taras Shevchenko National University of Kyiv. Physics and Mathematics(2), 53–57. https://doi.org/10.17721/1812-5409.2021/2.7
In this paper, we consider some properties of stochastic random matrices of large dimensions under conditions of independence of matrix elements or under conditions of independence of rows (columns). The main properties of stochastic random matrices spectrum are analyzed and the result of convergence to 0 is proved of almost all eigenvalues. Also, the application of these results to clustering problems and selection of the optimal number of clusters is considered. Note that the results obtained in this work are consistent with the Marchenko - Pastur theorem on the asymptotic distribution of eigenvalues of random matrices with independent elements. The results proved in this paper can be interpreted as a law of large numbers and will be used in the study of the asymptotic behavior of the maximum.
Pages of the article in the issue: 53 - 57
Language of the article: Ukrainian
Pages of the article in the issue: 53 - 57
Language of the article: Ukrainian
Тип зібрання :
Publication
Файл(и) :
Ескіз недоступний
Формат
Adobe PDF
Розмір :
592.24 KB
Контрольна сума:
(MD5):28f4b45583e8653600f764329e1dc89b
Ця робота розповсюджується на умовах ліцензії Creative Commons CC BY
10.17721/1812-5409.2021/2.7