<?xml version="1.0" encoding="UTF-8"?>
<!DOCTYPE article PUBLIC "-//NLM//DTD JATS (Z39.96) Journal Publishing DTD v1.3 20210610//EN" "JATS-journalpublishing1-3.dtd">
<article article-type="research-article" dtd-version="1.3" xmlns:mml="http://www.w3.org/1998/Math/MathML" xmlns:xlink="http://www.w3.org/1999/xlink" xmlns:xsi="http://www.w3.org/2001/XMLSchema-instance" xml:lang="ru"><front><journal-meta><journal-id journal-id-type="publisher-id">cheb</journal-id><journal-title-group><journal-title xml:lang="ru">Чебышевский сборник</journal-title><trans-title-group xml:lang="en"><trans-title>Chebyshevskii Sbornik</trans-title></trans-title-group></journal-title-group><issn pub-type="ppub">2226-8383</issn><publisher><publisher-name>Tula State Lev Tolstoy  Pedagogical University</publisher-name></publisher></journal-meta><article-meta><article-id pub-id-type="doi">10.22405/2226-8383-2025-26-4-7-32</article-id><article-id custom-type="elpub" pub-id-type="custom">cheb-2067</article-id><article-categories><subj-group subj-group-type="heading"><subject>Research Article</subject></subj-group><subj-group subj-group-type="section-heading" xml:lang="ru"><subject>Статьи</subject></subj-group><subj-group subj-group-type="section-heading" xml:lang="en"><subject>Article</subject></subj-group></article-categories><title-group><article-title>Развитие метода Зигеля – Шидловского в теории трансцендентных чисел</article-title><trans-title-group xml:lang="en"><trans-title>Development of Siegel–Shidlovskii method in transcendental number theory</trans-title></trans-title-group></title-group><contrib-group><contrib contrib-type="author" corresp="yes"><name-alternatives><name name-style="eastern" xml:lang="ru"><surname>Галочкин</surname><given-names>Александр Иванович</given-names></name><name name-style="western" xml:lang="en"><surname>Galochkin</surname><given-names>Alexandr Ivanovich</given-names></name></name-alternatives><bio xml:lang="ru"><p>доктор физико-математических наук, профессор</p></bio><bio xml:lang="en"><p>doctor of physical and mathematical sciences, professor</p></bio><email xlink:type="simple">aigalochkin@yandex.ru</email><xref ref-type="aff" rid="aff-1"/></contrib><contrib contrib-type="author" corresp="yes"><name-alternatives><name name-style="eastern" xml:lang="ru"><surname>Горелов</surname><given-names>Василий Александрович</given-names></name><name name-style="western" xml:lang="en"><surname>Gorelov</surname><given-names>Vasily Alexandrovich</given-names></name></name-alternatives><bio xml:lang="ru"><p>доктор физико-математических наук</p></bio><bio xml:lang="en"><p>doctor of physical and mathematical sciences</p></bio><email xlink:type="simple">gorelovva@mpei.ru</email><xref ref-type="aff" rid="aff-2"/></contrib><contrib contrib-type="author" corresp="yes"><name-alternatives><name name-style="eastern" xml:lang="ru"><surname>Нестеренко</surname><given-names>Юрий Валентинович</given-names></name><name name-style="western" xml:lang="en"><surname>Nesterenko</surname><given-names>Yuri Valentinovich</given-names></name></name-alternatives><bio xml:lang="ru"><p>доктор физико-математических наук, профессор, член-корреспондент РАН</p></bio><bio xml:lang="en"><p>doctor of physical and mathematical sciences, professor,corresponding member of RAS</p></bio><email xlink:type="simple">vgchirskii@yandex.ru</email><xref ref-type="aff" rid="aff-1"/></contrib><contrib contrib-type="author" corresp="yes"><name-alternatives><name name-style="eastern" xml:lang="ru"><surname>Салихов</surname><given-names>Владислав Хасанович</given-names></name><name name-style="western" xml:lang="en"><surname>Salihov</surname><given-names>Vladislav Khasanovich</given-names></name></name-alternatives><bio xml:lang="ru"><p>доктор физико-математических наук, профессор</p></bio><bio xml:lang="en"><p>doctor of physical and mathematical sciences, professor</p></bio><email xlink:type="simple">vgchirskii@yandex.ru</email></contrib><contrib contrib-type="author" corresp="yes"><name-alternatives><name name-style="eastern" xml:lang="ru"><surname>Чирский</surname><given-names>Владимир Григорьевич</given-names></name><name name-style="western" xml:lang="en"><surname>Chirskii</surname><given-names>Vladimir Grigor’evich</given-names></name></name-alternatives><bio xml:lang="ru"><p>доктор физико-математических наук, профессор</p></bio><bio xml:lang="en"><p>doctor of physical and mathematical sciences, professor</p></bio><email xlink:type="simple">vgchirskii@yandex.ru</email><xref ref-type="aff" rid="aff-1"/></contrib></contrib-group><aff-alternatives id="aff-1"><aff xml:lang="ru"><institution>Московский государственный университет им. М. В. Ломоносова</institution><country>Россия</country></aff><aff xml:lang="en"><institution>Lomonosov Moscow State University</institution><country>Russian Federation</country></aff></aff-alternatives><aff-alternatives id="aff-2"><aff xml:lang="ru"><institution>Московский энергетический институт</institution><country>Россия</country></aff><aff xml:lang="en"><institution>Moscow Power Engineering Institute</institution><country>Russian Federation</country></aff></aff-alternatives><pub-date pub-type="collection"><year>2025</year></pub-date><pub-date pub-type="epub"><day>29</day><month>12</month><year>2025</year></pub-date><volume>26</volume><issue>4</issue><fpage>7</fpage><lpage>32</lpage><permissions><copyright-statement>Copyright &amp;#x00A9; Галочкин А.И., Горелов В.А., Нестеренко Ю.В., Салихов В.Х., Чирский В.Г., 2025</copyright-statement><copyright-year>2025</copyright-year><copyright-holder xml:lang="ru">Галочкин А.И., Горелов В.А., Нестеренко Ю.В., Салихов В.Х., Чирский В.Г.</copyright-holder><copyright-holder xml:lang="en">Galochkin A.I., Gorelov V.A., Nesterenko Y.V., Salihov V.K., Chirskii V.G.</copyright-holder><license xml:lang="ru" license-type="creative-commons-attribution" xlink:href="https://creativecommons.org/licenses/by/4.0/" xlink:type="simple"><license-p>Данная работа распространяется под лицензией Creative Commons Attribution 4.0.</license-p></license><license xml:lang="en" license-type="creative-commons-attribution" xlink:href="https://creativecommons.org/licenses/by/4.0/" xlink:type="simple"><license-p>This work is licensed under a Creative Commons Attribution 4.0 License.</license-p></license></permissions><self-uri xlink:href="https://www.chebsbornik.ru/jour/article/view/2067">https://www.chebsbornik.ru/jour/article/view/2067</self-uri><abstract><p>В начале статьи приводится краткая биография А.Б. Шидловского. Затем рассказано об истоках метода — теоремах Эрмита и Линдемана. Формулируются основные определения и результаты работ К. Зигеля 1929 и 1949 годов. Дано определение 𝐸− функции иусловия нормальности совокупности функций, приведены примеры. Рассказ о работах А.Б.Шидловского начат с условия неприводимости системы функций. Затем сформулированы три основные теоремы А.Б. Шидловского и их основные следствия. Приведена теорема о линейной независимости значений совокупности 𝐸− функций, с коэффициентами из мнимого квадратичного поля. Сформулирована аналогичная теорема в случае произвольных алгебраических коэффициентов. Сформулирована гипотеза К. Зигеля о структуре множества 𝐸− функций, удовлетворяющих дифференциальным уравнениям, и рассказано о еёрешении. Приведены формулировки теорем, при условиях которых обобщённые гипергеометрические функции алгебраически независимы над полем рациональных функций, а их значения в алгебраических точках алгебраически независимы. Рассказано о количественных задачах — оценках мер линейной и алгебраической независимости значений функций.Приведены неулучшаемые оценки. Рассмотрен ещё один класс функций, к которому можно применить метод Зигеля – Шидловского, класс 𝐺−функций. Сформулировано условие сокращения факториалов, выполняющееся для всех рассматриваемых 𝐺− функций. Приведено понятие глобального соотношения и рассказано о возможности его применения к рядам, расходящимся в поле комплексных чисел. Рассказано об арифметической природе просуммированых расходящихся рядов.</p></abstract><trans-abstract xml:lang="en"><p>A brief biography of A.B. Shidlovskii is given at the beginning of the article. Then it tells about the origins of the method - the Hermite and Lindemann theorems. The main definitions and results of the works of K. Siegel in 1929 and 1949 are formulated. The definition of the𝐸− function and the conditions for the normality of a set of functions are given, examples are given. The story about the works of A.B. Shidlovskii began with the condition of irreducibility of a system of functions. Then the three main theorems of A.B. Shidlovskii and their main consequences are formulated. A theorem on the linear independence of the values of a set of 𝐸−functions with coefficients from an imaginary quadratic field is presented. A similar theorem is formulated in the case of arbitrary algebraic coefficients. The hypothesis of K. Siegel on the structure of the set of 𝐸− functions satisfying differential equations is formulated and its solution is described. The formulations of theorems are given under which generalized hypergeometricfunctions are algebraically independent over the field of rational functions, and their values at algebraic points are algebraically independent. Quantitative problems are described - estimates of measures of linear and algebraic independence of function values. Unimproved estimates are given. Another class of functions is considered, to which the Siegel-Shidlovskii method can be applied, the class of 𝐺− functions. The factorial cancelling condition is formulated, which holdsfor all considered 𝐺− functions. The concept of a global relation is given and the possibility of its application to series diverging in the field of complex numbers is described. It describes the arithmetic nature of results of summation of divergent series.</p></trans-abstract><kwd-group xml:lang="ru"><kwd>трансцендентные числа</kwd><kwd>метод Зигеля – Шидловского.</kwd></kwd-group><kwd-group xml:lang="en"><kwd>transcendental numbers</kwd><kwd>Siegel-Shidlovskii’s method.</kwd></kwd-group></article-meta></front><back><ref-list><title>References</title><ref id="cit1"><label>1</label><citation-alternatives><mixed-citation xml:lang="ru">Hermite Ch. Sur la fonction exponentielle.//C.R.Ac.Sci.(Paris) 1873.- v.77, pp.18-24,74-79,221-</mixed-citation><mixed-citation xml:lang="en">Hermite. Ch.1873.“ Sur la fonction exponentielle“,C.R.Ac.Sci.(Paris) Vol,77, pp.18-24,74- 79,221-233,285-293.</mixed-citation></citation-alternatives></ref><ref id="cit2"><label>2</label><citation-alternatives><mixed-citation xml:lang="ru">,285-293.</mixed-citation><mixed-citation xml:lang="en">Lindemann .F.1882.“ Uber die Zahl 𝜋“ Math.Ann. , Bd.20, pp.679-692.</mixed-citation></citation-alternatives></ref><ref id="cit3"><label>3</label><citation-alternatives><mixed-citation xml:lang="ru">Lindemann F. Uber die Zahl 𝜋.//Math.Ann. 1882.- Bd.20, pp.679-692.</mixed-citation><mixed-citation xml:lang="en">Siegel. C.L.1929-1930. “ Uber einige Anwendungen Diophantischer Approximationen“, Abh.</mixed-citation></citation-alternatives></ref><ref id="cit4"><label>4</label><citation-alternatives><mixed-citation xml:lang="ru">Siegel C.L.Uber einige Anwendungen Diophantischer Approximationen//Abh. Preuss. Acad. Wiss., Phys.-Math. Kl.-1929-1930.-N 1.-pp. 1-70.</mixed-citation><mixed-citation xml:lang="en">Preuss. Acad. Wiss., Phys.-Math. Kl.,N 1, pp. 1-70.</mixed-citation></citation-alternatives></ref><ref id="cit5"><label>5</label><citation-alternatives><mixed-citation xml:lang="ru">Siegel C.L. Transcendental numbers.- Princeton: Princeton University Press, 1949.</mixed-citation><mixed-citation xml:lang="en">Siegel. C.L.1949. “ Transcendental numbers“, Princeton: Princeton University Press.</mixed-citation></citation-alternatives></ref><ref id="cit6"><label>6</label><citation-alternatives><mixed-citation xml:lang="ru">Beukers F.; Brownawell W.D; Heckman G.. Siegel normality.// Ann.Math.-1988.-Ser.127.-P.279-308.</mixed-citation><mixed-citation xml:lang="en">Beukers. F.; Brownawell. W. D.; Heckman. G.1988.“ Siegel normality“, Ann.Math,Ser.127, p.279-</mixed-citation></citation-alternatives></ref><ref id="cit7"><label>7</label><citation-alternatives><mixed-citation xml:lang="ru">Шидловский А. Б. Трансцендентные числа.-М.: «Наука».-1987.-448 с.(Английский перевод:[3] Andrei B.Shidlovskii. Transcendental Numbers. W.de Gruyter.-Berlin.-New York.-1989.-467pp.).</mixed-citation><mixed-citation xml:lang="en">Шидловский А. Б. Трансцендентные числа.-М.: «Наука».-1987.-448 с.(Английский перевод:[3] Andrei B.Shidlovskii. Transcendental Numbers. W.de Gruyter.-Berlin.-New York.-1989.-467pp.).</mixed-citation></citation-alternatives></ref><ref id="cit8"><label>8</label><citation-alternatives><mixed-citation xml:lang="ru">Шидловский А. Б. О трансцендентности и алгебраической независимости значений целых</mixed-citation><mixed-citation xml:lang="en">Shidlovskii. A. B. 1989. “ Transcendental numbers“, W.de Gruyter.-Berlin.-New York. 467 pp.</mixed-citation></citation-alternatives></ref><ref id="cit9"><label>9</label><citation-alternatives><mixed-citation xml:lang="ru">функций некоторых классов//ДАН СССР. -1954. -Т.90. -№4.-С. 697-700.</mixed-citation><mixed-citation xml:lang="en">Shidlovskii. A. B. 1954. “ On transcendence and algebraic independence of the values of certain</mixed-citation></citation-alternatives></ref><ref id="cit10"><label>10</label><citation-alternatives><mixed-citation xml:lang="ru">Шидловский А. Б. О трансцендентности и алгебраической независимости значений целых</mixed-citation><mixed-citation xml:lang="en">classes of entire functions “, Dokl. Akad. Nauk SSSR, Vol. 96, p.697 -700.</mixed-citation></citation-alternatives></ref><ref id="cit11"><label>11</label><citation-alternatives><mixed-citation xml:lang="ru">функций некоторых классов//Учен. зап. МГУ. -1959. - Вып. 180. Мат. 9. - С.11-70.</mixed-citation><mixed-citation xml:lang="en">Shidlovskii. A. B. 1959. “ On transcendence and algebraic independence of the values of certain</mixed-citation></citation-alternatives></ref><ref id="cit12"><label>12</label><citation-alternatives><mixed-citation xml:lang="ru">Нестеренко Ю.В. Об алгебраической независимости значений Е-функций, удовлетворяю-</mixed-citation><mixed-citation xml:lang="en">classes of entire functions “, Uch. Zap. Mosk. Univ., Vol. 186, p.11 -70.</mixed-citation></citation-alternatives></ref><ref id="cit13"><label>13</label><citation-alternatives><mixed-citation xml:lang="ru">щих линейным неоднородным дифференциальным уравнениям. //Мат. заметки. -1969. -Т.5. - №.5. -С.587-589.</mixed-citation><mixed-citation xml:lang="en">Nesterenko. Yu. V. 1969. “ On algebraic independence of the values of E-functions satisfying</mixed-citation></citation-alternatives></ref><ref id="cit14"><label>14</label><citation-alternatives><mixed-citation xml:lang="ru">Галочкин А. И.Об алгебраической независимости значений Е-функций в некоторых трансцендентных точках.//Вестник МГУ.Сер.1. Матем. ,механ. -1970. -№5.-58-63</mixed-citation><mixed-citation xml:lang="en">nonhomogeneous linear differential equations“, Math. Notes, Vol. 5, p.352-358.</mixed-citation></citation-alternatives></ref><ref id="cit15"><label>15</label><citation-alternatives><mixed-citation xml:lang="ru">Шидловский А. Б. Нестеренко Ю.В. О линейной независимости значений 𝐸-функций.//Матем. Сб.-1996. -т.187. -№8.- с.93-108.</mixed-citation><mixed-citation xml:lang="en">Galochkin. A. I. 1970. “ On algebraic independence of the values of E-functions at certain</mixed-citation></citation-alternatives></ref><ref id="cit16"><label>16</label><citation-alternatives><mixed-citation xml:lang="ru">Andr´e Y. S´eries Gevrey de type arithm´etique,I,II//Ann.Math. 151.-2000. -705-740,741-756.</mixed-citation><mixed-citation xml:lang="en">transcendental points“, Mosc. Univ. Math. Bull., No. 5, p.41-45.</mixed-citation></citation-alternatives></ref><ref id="cit17"><label>17</label><citation-alternatives><mixed-citation xml:lang="ru">Beukers F. A refined version of the Siegel-Shidlovskii theorem//Ann. Math.163.-2006.-369-379.</mixed-citation><mixed-citation xml:lang="en">Shidlovskii. A. B.; Nesterenko. Yu.V. 1996. “ On linear independence of the values of E-functions</mixed-citation></citation-alternatives></ref><ref id="cit18"><label>18</label><citation-alternatives><mixed-citation xml:lang="ru">Горелов В. А.. Частный случай задачи о линейной независимости значений Е-функций //</mixed-citation><mixed-citation xml:lang="en">“, Mat. Sb. , Vol. 187,No 8, p.93 -108.</mixed-citation></citation-alternatives></ref><ref id="cit19"><label>19</label><citation-alternatives><mixed-citation xml:lang="ru">Вестник МЭИ.-2004.-№6.-С. 39-42.</mixed-citation><mixed-citation xml:lang="en">Andr´e. Y. 2000. “ S´eries Gevrey de type arithm´etique,I,II“, Ann.Math., 151, p.705-740,741-756.</mixed-citation></citation-alternatives></ref><ref id="cit20"><label>20</label><citation-alternatives><mixed-citation xml:lang="ru">Шидловский А. Б. Об одном критерии алгебраической независимости значений Е-</mixed-citation><mixed-citation xml:lang="en">Beukers. F. 2006.“ A refined version of the Siegel-Shidlovskii theorem“, Ann.Math., 163, p.369-</mixed-citation></citation-alternatives></ref><ref id="cit21"><label>21</label><citation-alternatives><mixed-citation xml:lang="ru">функций в алгебраических точках.// Вестн. Моск. ун-та. Сер 1. Матем.мех.-1989.-№6.-С.17-21.</mixed-citation><mixed-citation xml:lang="en">функций в алгебраических точках.// Вестн. Моск. ун-та. Сер 1. Матем.мех.-1989.-№6.-С.17-21.</mixed-citation></citation-alternatives></ref><ref id="cit22"><label>22</label><citation-alternatives><mixed-citation xml:lang="ru">Adamczewski S, Rivoal T. Exceptional values of E-functions at algebraic points// Bull. London</mixed-citation><mixed-citation xml:lang="en">Gorelov. V. A. 2004. “ A special case of the problem of linear independence of the values of</mixed-citation></citation-alternatives></ref><ref id="cit23"><label>23</label><citation-alternatives><mixed-citation xml:lang="ru">Math. Soc.-2018.-50.-P.697-708.</mixed-citation><mixed-citation xml:lang="en">E-functions “, Vest, MEI ,No 6, p.39 - 42.</mixed-citation></citation-alternatives></ref><ref id="cit24"><label>24</label><citation-alternatives><mixed-citation xml:lang="ru">Салихов В. Х. Об алгебраической независимости значений Е-функций, удовлетворяющих</mixed-citation><mixed-citation xml:lang="en">Shidlovskii. A. B. 1989. “ Criterion of algebraic independence of the values of E-functions at</mixed-citation></citation-alternatives></ref><ref id="cit25"><label>25</label><citation-alternatives><mixed-citation xml:lang="ru">линейным дифференцивльным уравнениям первого порядка.// Мат. заметки.-1973.- Т.13.-№ 1.- С.29-40.</mixed-citation><mixed-citation xml:lang="en">algebraic points “, Mosc. Univ. Math. Bull., Ser. 1, p.20 -25.</mixed-citation></citation-alternatives></ref><ref id="cit26"><label>26</label><citation-alternatives><mixed-citation xml:lang="ru">Горелов В. А.. Об ослабленной гипотезе Зигеля//Фунд.и прикл. матем.-2005.- т.11.-№6.-33-</mixed-citation><mixed-citation xml:lang="en">Adamczewski. S.; Rivoal. T. 2018. “ Exceptional values of E-functions at algebraic points “,</mixed-citation></citation-alternatives></ref><ref id="cit27"><label>27</label><citation-alternatives><mixed-citation xml:lang="ru">Bull. London Math. Soc., 50, p.697-708.</mixed-citation><mixed-citation xml:lang="en">Bull. London Math. Soc., 50, p.697-708.</mixed-citation></citation-alternatives></ref><ref id="cit28"><label>28</label><citation-alternatives><mixed-citation xml:lang="ru">Горелов В. А.. Об алгебраической независимости значений Е-функций в особых точках и</mixed-citation><mixed-citation xml:lang="en">Salikhov. V. Kh. 1973. “ On algebraic independence of the values of E-functions satisfying first</mixed-citation></citation-alternatives></ref><ref id="cit29"><label>29</label><citation-alternatives><mixed-citation xml:lang="ru">гипотезе Зигеля.// Мат. заметки.-2000.- Т.67.- № 12.- С.174-190.</mixed-citation><mixed-citation xml:lang="en">order linear differential equations “, Mat. Zametki , Vol. 13,No 1, p.29 - 40.</mixed-citation></citation-alternatives></ref><ref id="cit30"><label>30</label><citation-alternatives><mixed-citation xml:lang="ru">Fischler S, Rivoal T. On Siegel’s problem for E-functions // Rend.Sem.Mat. Univ.Padova</mixed-citation><mixed-citation xml:lang="en">Gorelov. V.A. 2000. “ On a weakened Siegel’s hypothesis“, Mat. Zametki,Vol 11, No 6, p.33 -</mixed-citation></citation-alternatives></ref><ref id="cit31"><label>31</label><citation-alternatives><mixed-citation xml:lang="ru">(2022).-83-115.</mixed-citation><mixed-citation xml:lang="en">(2022).-83-115.</mixed-citation></citation-alternatives></ref><ref id="cit32"><label>32</label><citation-alternatives><mixed-citation xml:lang="ru">Галочкин А. И. О критерии принадлежности гипергеометрических функций Зигеля классу</mixed-citation><mixed-citation xml:lang="en">Gorelov. V. A. 2004. “ On algebraic independence of the values of E-functions at exceptional</mixed-citation></citation-alternatives></ref><ref id="cit33"><label>33</label><citation-alternatives><mixed-citation xml:lang="ru">Е-функций. //Мат. Заметки. -1981.-Т.29.-№1.-С. 3-14.</mixed-citation><mixed-citation xml:lang="en">points and Siegel’s hypothesis“, Mat. Zametki,Vol 67, No 4, p.549 - 565.</mixed-citation></citation-alternatives></ref><ref id="cit34"><label>34</label><citation-alternatives><mixed-citation xml:lang="ru">Maier W. Potenzreihen irrationalen Grenzwertes//J. Reine und angew. Math.-1927.-Bd.156.-S.</mixed-citation><mixed-citation xml:lang="en">Fichler. S.; Rivoal. T. 2022. “ On Siegel’s problem for E-functions “, Rend. Sem. Mat. Univ.</mixed-citation></citation-alternatives></ref><ref id="cit35"><label>35</label><citation-alternatives><mixed-citation xml:lang="ru">-148.</mixed-citation><mixed-citation xml:lang="en">Padova, 148, p.83-115.</mixed-citation></citation-alternatives></ref><ref id="cit36"><label>36</label><citation-alternatives><mixed-citation xml:lang="ru">Олейников В. А.. Об алгебраической независимости значений Е-функций. //Мат. сб.- 1969.</mixed-citation><mixed-citation xml:lang="en">Galochkin. A. I. 1981. “ A criterion for hypergeometric Siegel functions to belong to the class</mixed-citation></citation-alternatives></ref><ref id="cit37"><label>37</label><citation-alternatives><mixed-citation xml:lang="ru">Т.78(120), №2. -С.301-306.</mixed-citation><mixed-citation xml:lang="en">of E-functions“, Mat. Zametki, Vol. 29, No. 1, p.3-14.</mixed-citation></citation-alternatives></ref><ref id="cit38"><label>38</label><citation-alternatives><mixed-citation xml:lang="ru">Салихов В. Х. Критерий алгебраической независимости одного класса гипергеометрических E-функций.//Матем. сб. -1990.-т.181.-№2.-с.189-211.</mixed-citation><mixed-citation xml:lang="en">Maier. W. 1927.“ Potenzreihen irrationalen Grenzwertes“, J. Reine und angew. Math., 156,</mixed-citation></citation-alternatives></ref><ref id="cit39"><label>39</label><citation-alternatives><mixed-citation xml:lang="ru">Салихов В. Х. Неприводимость гипергеометрических уравнений и алгебраическая независимость значений E-функций.//Acta Arithm.-1990.-v.53.- p.453-471.</mixed-citation><mixed-citation xml:lang="en">p.93-148.</mixed-citation></citation-alternatives></ref><ref id="cit40"><label>40</label><citation-alternatives><mixed-citation xml:lang="ru">Fel’dman N.I; Nesterenko Yu.V. Encyclopaedia of Mathematical Sciences, vol.44. A.N. Parshin,</mixed-citation><mixed-citation xml:lang="en">Oleinikov. V. A. 1990. “ On algebraic independence of the values of E-functions “, Mat. Sb,,Vol</mixed-citation></citation-alternatives></ref><ref id="cit41"><label>41</label><citation-alternatives><mixed-citation xml:lang="ru">I.R. Shafarevich (Eds.) Number Theory IV. Transcendental Numbers. Springer Verlag.-1998.</mixed-citation><mixed-citation xml:lang="en">(120), No 2, p.301-306.</mixed-citation></citation-alternatives></ref><ref id="cit42"><label>42</label><citation-alternatives><mixed-citation xml:lang="ru">Borel E. Sur la nature arithmetique du nombre e. // C.R.Ac.Sci.(Paris).-1899.-V.128.-P,596-599.</mixed-citation><mixed-citation xml:lang="en">Salikhov. V. Kh. 1990. “ A criterion for the algebraic independence of the values of a class of</mixed-citation></citation-alternatives></ref><ref id="cit43"><label>43</label><citation-alternatives><mixed-citation xml:lang="ru">Popken J. Zur Transzendenz von e. //Math.Zs.-1929.-Bd.29.-S. 525-541.</mixed-citation><mixed-citation xml:lang="en">hypergeometric E-functions “, Math. USSR Sb. , Vol. 69, p.203 - 226.</mixed-citation></citation-alternatives></ref><ref id="cit44"><label>44</label><citation-alternatives><mixed-citation xml:lang="ru">Mahler K. Zur Approximation der Exponentialfunction und des Logarithms. 1// J.reine und angew. Math.-1932.-Bd.166.-S. 118-136.</mixed-citation><mixed-citation xml:lang="en">Salikhov. V.Kh. 1990. “ Irreducibility of hypergeometric equations and algebraic independence</mixed-citation></citation-alternatives></ref><ref id="cit45"><label>45</label><citation-alternatives><mixed-citation xml:lang="ru">Lang S. A transcendence measure for 𝐸−functions. // Mathematika. -1962. -V.9. - P.157-161.</mixed-citation><mixed-citation xml:lang="en">of the values of E-functions “, Acta Arithm. , Vol. 53, p.453 - 471.</mixed-citation></citation-alternatives></ref><ref id="cit46"><label>46</label><citation-alternatives><mixed-citation xml:lang="ru">Галочкин А. И. Оценка меры взаимной трансцендентности значений E-функций.//Мат. Заметки.-1968.-Т.3.-№4.-С.377-386.</mixed-citation><mixed-citation xml:lang="en">Fel’dman. N. I. ; Nesterenko. Yu.V. 1998. “ Encyclopaedia of Mathematical Sciences, A.N.</mixed-citation></citation-alternatives></ref><ref id="cit47"><label>47</label><citation-alternatives><mixed-citation xml:lang="ru">Шидловский А. Б. Об оценках меры трансцендентности значений 𝐸−функций.//Мат.</mixed-citation><mixed-citation xml:lang="en">Parshin, I.R. Shafarevich (Eds.) Number Theory IV. Transcendental Numbers.“, Springer</mixed-citation></citation-alternatives></ref><ref id="cit48"><label>48</label><citation-alternatives><mixed-citation xml:lang="ru">Заметки.-1967.-Т.2.-№1.-С.33-44.</mixed-citation><mixed-citation xml:lang="en">Verlag., Vol. 44,345 pp.</mixed-citation></citation-alternatives></ref><ref id="cit49"><label>49</label><citation-alternatives><mixed-citation xml:lang="ru">Нестеренко Ю.В. Оценки порядков нулей аналитических функций некоторого класса и их</mixed-citation><mixed-citation xml:lang="en">Borel. E. 1899.“ Sur la nature arithmetique du nombre e.“, C.R.Ac.Sci.(Paris), 128, p.596-599.</mixed-citation></citation-alternatives></ref><ref id="cit50"><label>50</label><citation-alternatives><mixed-citation xml:lang="ru">приложения в теории трансцендентных чисел. //ДАН СССР. -1972. -Т.205.-№2.-С. 292-295.</mixed-citation><mixed-citation xml:lang="en">Popken. J. 1929.“ Zur Transzendenz von e.“, Math.Zs, Bd.29, p.525-541.</mixed-citation></citation-alternatives></ref><ref id="cit51"><label>51</label><citation-alternatives><mixed-citation xml:lang="ru">Bertrand D; Chirskii V, Yebbou J. Effective estimates for global relations on Euler-type series.//Ann.Fac.Sci. Toulouse.-2004.-V.XIII.-no.2.-PP.241-260.</mixed-citation><mixed-citation xml:lang="en">Mahler. K. 1932.“ Zur Approximation der Exponentialfunction und des Logarithms.“, J.reine</mixed-citation></citation-alternatives></ref><ref id="cit52"><label>52</label><citation-alternatives><mixed-citation xml:lang="ru">Osgood C. Some theorems on Diophantine approximation.//Trans.Am.Math.Soc. 1966.- 123.-</mixed-citation><mixed-citation xml:lang="en">und angew. Math., Bd.166, p.118-136.</mixed-citation></citation-alternatives></ref><ref id="cit53"><label>53</label><citation-alternatives><mixed-citation xml:lang="ru">-87.</mixed-citation><mixed-citation xml:lang="en">Lang. S. 1962.“ A transcendence measure for 𝐸−functions.“, Mathematika., V.9, p.157-161.</mixed-citation></citation-alternatives></ref><ref id="cit54"><label>54</label><citation-alternatives><mixed-citation xml:lang="ru">Галочкин А. И. Оценки снизу линейных форм от значений некоторых гипергеометрических функций. //Мат. заметки.-1970.-Т.8.-№1.-С. 19-28.</mixed-citation><mixed-citation xml:lang="en">Galochkin. A. I. 1968. “ Estimate for the conjugate transcendence measure for the values of</mixed-citation></citation-alternatives></ref><ref id="cit55"><label>55</label><citation-alternatives><mixed-citation xml:lang="ru">Коробов А. Н.Оценки некоторых линейных форм. //Вестник МГУ, Серия 1. Матем.,</mixed-citation><mixed-citation xml:lang="en">E-functions“, Mat. Zametki, Vol. 3, No. 4, p.377-386.</mixed-citation></citation-alternatives></ref><ref id="cit56"><label>56</label><citation-alternatives><mixed-citation xml:lang="ru">механ.1981.- № 6.С. 36-40.</mixed-citation><mixed-citation xml:lang="en">Shidlovskii. A. B. 1967. “ Transcendence measure estimates for the values of E-functions. “, Mat.</mixed-citation></citation-alternatives></ref><ref id="cit57"><label>57</label><citation-alternatives><mixed-citation xml:lang="ru">Korobov A.N. Multidimensional continued fractions and estimates of linear forms.//ActaArith.-</mixed-citation><mixed-citation xml:lang="en">Zametki, Vol. 2, No. 1, p.33-44.</mixed-citation></citation-alternatives></ref><ref id="cit58"><label>58</label><citation-alternatives><mixed-citation xml:lang="ru">-71.-331-349.</mixed-citation><mixed-citation xml:lang="en">Nesterenko. Yu. V. 1969. “ Estimates of the orders of zeros of analytic functions of a certain</mixed-citation></citation-alternatives></ref><ref id="cit59"><label>59</label><citation-alternatives><mixed-citation xml:lang="ru">Галочкин А. И. О неулучшаемых по высоте оценках некоторых линейных форм. //Мат.сб.-</mixed-citation><mixed-citation xml:lang="en">class and their applications to the theory of transcendental numbers“, Sov. Math. Dokl., Vol.</mixed-citation></citation-alternatives></ref><ref id="cit60"><label>60</label><citation-alternatives><mixed-citation xml:lang="ru">-Т.124(166).-№4(7).-С. 416-430.</mixed-citation><mixed-citation xml:lang="en">, p.938-942.</mixed-citation></citation-alternatives></ref><ref id="cit61"><label>61</label><citation-alternatives><mixed-citation xml:lang="ru">Иванков П. Л. Об арифметических свойствах значений гипергеометрических функций. //</mixed-citation><mixed-citation xml:lang="en">Bertrand. D; Chirskii. V.; Yebbou. J.2004. “ Effective estimates for global relations on Eulertype</mixed-citation></citation-alternatives></ref><ref id="cit62"><label>62</label><citation-alternatives><mixed-citation xml:lang="ru">Мат.сб.-1991.-Т.182.-С. 282-302.</mixed-citation><mixed-citation xml:lang="en">series. “, Ann.Fac.Sci. Toulouse., Vol. 13, No. 2, p.241-260.</mixed-citation></citation-alternatives></ref><ref id="cit63"><label>63</label><citation-alternatives><mixed-citation xml:lang="ru">Галочкин А. И.Оценки снизу многочленов от значений аналитических функций одного класса. // Матем.сб. -1974. -т.95(137) №3(11). -с.396-417.</mixed-citation><mixed-citation xml:lang="en">Osgood. C. 1966.“ Some theorems on Diophantine approximation.“, Trans.Am.Math.Soc.,</mixed-citation></citation-alternatives></ref><ref id="cit64"><label>64</label><citation-alternatives><mixed-citation xml:lang="ru">Chudnovsky G.V. On applications of Diophantine approximations. //Proc.Natl.Acad.Sci.USA.-</mixed-citation><mixed-citation xml:lang="en">V.123, p.64-87.</mixed-citation></citation-alternatives></ref><ref id="cit65"><label>65</label><citation-alternatives><mixed-citation xml:lang="ru">-v.81.-p.7261-7265.</mixed-citation><mixed-citation xml:lang="en">Galochkin. A. I. 1970. “ A lower bound for linear forms in the values of certain hypergeometric</mixed-citation></citation-alternatives></ref><ref id="cit66"><label>66</label><citation-alternatives><mixed-citation xml:lang="ru">Bombieri E. On 𝐺− functions// Recent Progress in Analytic Number Theory.v.2. London:</mixed-citation><mixed-citation xml:lang="en">functions“, Mat. Notes,8, p.478-484.</mixed-citation></citation-alternatives></ref><ref id="cit67"><label>67</label><citation-alternatives><mixed-citation xml:lang="ru">Academic Press, 1981.-p.1-68.</mixed-citation><mixed-citation xml:lang="en">Korobov. A. N. 1981. “ Estimates for certain linear forms “, Mosc. Univ. Math. Bull,6, p.45-49.</mixed-citation></citation-alternatives></ref><ref id="cit68"><label>68</label><citation-alternatives><mixed-citation xml:lang="ru">Харди Г. Г. Расходящиеся ряды.-М.:«URSS».-2006.-506с.</mixed-citation><mixed-citation xml:lang="en">Korobov. A. N. 1993. “ Multidimensional continued fractions and estimates of linear forms.“,</mixed-citation></citation-alternatives></ref><ref id="cit69"><label>69</label><citation-alternatives><mixed-citation xml:lang="ru">Рамис Ж.П. Расходящиеся ряды и асимптотические теории.-М.-Иж.: «Институт компьютерных технологий».-2002.-80 с.</mixed-citation><mixed-citation xml:lang="en">ActaArith.,71, p.331-349.</mixed-citation></citation-alternatives></ref><ref id="cit70"><label>70</label><citation-alternatives><mixed-citation xml:lang="ru">Ferguson T. Algebraic properties of Э-functions.//J.Number Theory. 2021.- v.229, pp.168-178.</mixed-citation><mixed-citation xml:lang="en">Galochkin. A. I. 1984. “ On estimates, unimprovable with respect to height, of some linear forms</mixed-citation></citation-alternatives></ref><ref id="cit71"><label>71</label><citation-alternatives><mixed-citation xml:lang="ru">Fischler S.;Rivoal T. Arithmetic theory of E-operators .//J.d l’Ecole polytechnique-Mathematiques.-2016.-т. 3.-с. 31 -65</mixed-citation><mixed-citation xml:lang="en">“, Math. USSR Sb.,52, p.407-419.</mixed-citation></citation-alternatives></ref><ref id="cit72"><label>72</label><citation-alternatives><mixed-citation xml:lang="ru">Fischler S.;Rivoal T. Microsolutions of differential operators and values of arithmetic Gevrey</mixed-citation><mixed-citation xml:lang="en">Ivankov. P. L. 1991. “ On arithmetic properties of the values of hypergeometric functions“, Math.</mixed-citation></citation-alternatives></ref><ref id="cit73"><label>73</label><citation-alternatives><mixed-citation xml:lang="ru">series.//Michigan Math. J.-2018.-c.239-254</mixed-citation><mixed-citation xml:lang="en">USSR Sb.,72, p.267-286.</mixed-citation></citation-alternatives></ref><ref id="cit74"><label>74</label><citation-alternatives><mixed-citation xml:lang="ru">Rivoal T.On the arithmetic nature of the values of the Gamma function,Euler’s constant and</mixed-citation><mixed-citation xml:lang="en">Galochkin. A. I. 1974. “ Estimates from below of polynomials in the values of analytic functions</mixed-citation></citation-alternatives></ref><ref id="cit75"><label>75</label><citation-alternatives><mixed-citation xml:lang="ru">Gompertz’s constant.//American J.of Math.-2012.-n/140.-№2.-с.317-348.</mixed-citation><mixed-citation xml:lang="en">of a certain class “, Math. USSR Sb.,24, p.385-407.</mixed-citation></citation-alternatives></ref><ref id="cit76"><label>76</label><citation-alternatives><mixed-citation xml:lang="ru">Fischler S.;Rivoal T. Relations between values of arithmetic Gevrey series, and applications</mixed-citation><mixed-citation xml:lang="en">Chudnovsky. G. V. 1985. “ On applications of Diophantine approximations. “, Proc. Natl. Acad.</mixed-citation></citation-alternatives></ref><ref id="cit77"><label>77</label><citation-alternatives><mixed-citation xml:lang="ru">to values of the Gamma function. arXiv:2301.13518v1[math.NT].</mixed-citation><mixed-citation xml:lang="en">Sci. USA., v. 81, p.7261-7265.</mixed-citation></citation-alternatives></ref><ref id="cit78"><label>78</label><citation-alternatives><mixed-citation xml:lang="ru">Andre Y.Arithmetic Gevrey series and transcendence. A survey.//J.Theor.Nombres Bordeaux.-</mixed-citation><mixed-citation xml:lang="en">Bombieri. E. 1981.“ On 𝐺− functions.Recent Progress in Analytic Number Theory“, London:</mixed-citation></citation-alternatives></ref><ref id="cit79"><label>79</label><citation-alternatives><mixed-citation xml:lang="ru">-т.15.-с.1-10.</mixed-citation><mixed-citation xml:lang="en">Academic Press, V.2, p.1-68.</mixed-citation></citation-alternatives></ref><ref id="cit80"><label>80</label><citation-alternatives><mixed-citation xml:lang="ru">Bertrand D.;Beukers F.Equations differentielles linearies et majorations de multiplicities.-1985.-</mixed-citation><mixed-citation xml:lang="en">Hardy G.H.1949.“ Divergent Series“, Clarendon Press.-London.510pp.</mixed-citation></citation-alternatives></ref><ref id="cit81"><label>81</label><citation-alternatives><mixed-citation xml:lang="ru">Annales scientifiques ENS.-т.18.-№1.-с.181-192.</mixed-citation><mixed-citation xml:lang="en">Ramis, J.P.1993.“ Series divergentes et theories asymptotiques“, Panoramas et Syntheses,</mixed-citation></citation-alternatives></ref><ref id="cit82"><label>82</label><citation-alternatives><mixed-citation xml:lang="ru">Chirskii V. G. Product Formula, Global Relations and Polyadic Integers // Russ. J. Math.</mixed-citation><mixed-citation xml:lang="en">no.21, Soc. Math. France. -Paris.80pp.</mixed-citation></citation-alternatives></ref><ref id="cit83"><label>83</label><citation-alternatives><mixed-citation xml:lang="ru">Phys. 2019.- v.26, no.3, pp.286-305.</mixed-citation><mixed-citation xml:lang="en">Ferguson. T.2021.“Arithmetic properties of Э-functions“,J.Number Theoty, Vol, 229, pp.168-178.</mixed-citation></citation-alternatives></ref><ref id="cit84"><label>84</label><citation-alternatives><mixed-citation xml:lang="ru">Chirskii V. G. Arithmetic properties of generalized hypergeometric 𝐹– series // Russ. J. Math.</mixed-citation><mixed-citation xml:lang="en">Fischler. S.;Rivoal. T.2016.“Arithmetic theory of E-operators“,J.d l’Ecole polytechnique-Mathematiques,</mixed-citation></citation-alternatives></ref><ref id="cit85"><label>85</label><citation-alternatives><mixed-citation xml:lang="ru">Phys. 2020.- v.27, no.2, pp.175-184.</mixed-citation><mixed-citation xml:lang="en">Vol, 3, pp.31-65.</mixed-citation></citation-alternatives></ref><ref id="cit86"><label>86</label><citation-alternatives><mixed-citation xml:lang="ru">Чирский В. Г. Арифметические свойства значений обобщённых гипергеометрических рядов с полиадическими трансцендентными параметрами.//Доклады Российской академии наук. Математика, информатика, процессы упраления. -2022.-т. 506.-с. 95 – 107</mixed-citation><mixed-citation xml:lang="en">Fischler.S.;Rivoal.T.2018.“Microsolutions of differential operators and values of arithmetic</mixed-citation></citation-alternatives></ref><ref id="cit87"><label>87</label><citation-alternatives><mixed-citation xml:lang="ru">Ernvall-Hytonen A.-M.;Matala-aho T.;Seppala I. Euler’s factorial series, Hardy integral, and</mixed-citation><mixed-citation xml:lang="en">Gevrey series“,Michigan Math. J., Vol, 61, pp.239-254.</mixed-citation></citation-alternatives></ref><ref id="cit88"><label>88</label><citation-alternatives><mixed-citation xml:lang="ru">continued fractions.//J.Number Theory. 2023.-v.244.-pp.224-250.</mixed-citation><mixed-citation xml:lang="en">Rivoal.T.2012.“On the arithmetic nature of the values of the Gamma function,Euler’s constant</mixed-citation></citation-alternatives></ref><ref id="cit89"><label>89</label><citation-alternatives><mixed-citation xml:lang="ru">and Gompertz’s constant“,American J.of Math, Vol, 140,no.2. pp.317-348.</mixed-citation><mixed-citation xml:lang="en">and Gompertz’s constant“,American J.of Math, Vol, 140,no.2. pp.317-348.</mixed-citation></citation-alternatives></ref><ref id="cit90"><label>90</label><citation-alternatives><mixed-citation xml:lang="ru">Fischler. S.;Rivoal. T.2023. “Relations between values of arithmetic Gevrey series, and</mixed-citation><mixed-citation xml:lang="en">Fischler. S.;Rivoal. T.2023. “Relations between values of arithmetic Gevrey series, and</mixed-citation></citation-alternatives></ref><ref id="cit91"><label>91</label><citation-alternatives><mixed-citation xml:lang="ru">applications to values of the Gamma function“,( arXiv:2301.13518v1[math.NT])</mixed-citation><mixed-citation xml:lang="en">applications to values of the Gamma function“,( arXiv:2301.13518v1[math.NT])</mixed-citation></citation-alternatives></ref><ref id="cit92"><label>92</label><citation-alternatives><mixed-citation xml:lang="ru">Andre.Y.2003.“Arithmetic Gevrey series and transcendence. A survey“,J. Theor. Nombres</mixed-citation><mixed-citation xml:lang="en">Andre.Y.2003.“Arithmetic Gevrey series and transcendence. A survey“,J. Theor. Nombres</mixed-citation></citation-alternatives></ref><ref id="cit93"><label>93</label><citation-alternatives><mixed-citation xml:lang="ru">Bordeaux, Vol, 15, pp.1-10.</mixed-citation><mixed-citation xml:lang="en">Bordeaux, Vol, 15, pp.1-10.</mixed-citation></citation-alternatives></ref><ref id="cit94"><label>94</label><citation-alternatives><mixed-citation xml:lang="ru">Bertrand.D.;Beukers.F.1985.“Equations differentielles linearies et majorations de multiplicities</mixed-citation><mixed-citation xml:lang="en">Bertrand.D.;Beukers.F.1985.“Equations differentielles linearies et majorations de multiplicities</mixed-citation></citation-alternatives></ref><ref id="cit95"><label>95</label><citation-alternatives><mixed-citation xml:lang="ru">“,Annales scientifiques ENS, Vol, 18,no.1. pp.181-192.</mixed-citation><mixed-citation xml:lang="en">“,Annales scientifiques ENS, Vol, 18,no.1. pp.181-192.</mixed-citation></citation-alternatives></ref><ref id="cit96"><label>96</label><citation-alternatives><mixed-citation xml:lang="ru">Chirskii V. G. 2019. “Product Formula, Global Relations and Polyadic Integers“, Russ. J. Math.</mixed-citation><mixed-citation xml:lang="en">Chirskii V. G. 2019. “Product Formula, Global Relations and Polyadic Integers“, Russ. J. Math.</mixed-citation></citation-alternatives></ref><ref id="cit97"><label>97</label><citation-alternatives><mixed-citation xml:lang="ru">Phys., Vol.26, no.3, pp.286-305.</mixed-citation><mixed-citation xml:lang="en">Phys., Vol.26, no.3, pp.286-305.</mixed-citation></citation-alternatives></ref><ref id="cit98"><label>98</label><citation-alternatives><mixed-citation xml:lang="ru">Chirskii V. G.2020. “ Arithmetic properties of generalized hypergeometric F- series“, Russ. J.</mixed-citation><mixed-citation xml:lang="en">Chirskii V. G.2020. “ Arithmetic properties of generalized hypergeometric F- series“, Russ. J.</mixed-citation></citation-alternatives></ref><ref id="cit99"><label>99</label><citation-alternatives><mixed-citation xml:lang="ru">Math. Phys., Vol.27, no.2, pp.175-184.</mixed-citation><mixed-citation xml:lang="en">Math. Phys., Vol.27, no.2, pp.175-184.</mixed-citation></citation-alternatives></ref><ref id="cit100"><label>100</label><citation-alternatives><mixed-citation xml:lang="ru">Chirskii V. G.2022. “ Arithmetic properties of values of generalized hypergeometric series with</mixed-citation><mixed-citation xml:lang="en">Chirskii V. G.2022. “ Arithmetic properties of values of generalized hypergeometric series with</mixed-citation></citation-alternatives></ref><ref id="cit101"><label>101</label><citation-alternatives><mixed-citation xml:lang="ru">polyadic transcendental parameters“, Doklady Math., Vol.506,p.95-107.</mixed-citation><mixed-citation xml:lang="en">polyadic transcendental parameters“, Doklady Math., Vol.506,p.95-107.</mixed-citation></citation-alternatives></ref><ref id="cit102"><label>102</label><citation-alternatives><mixed-citation xml:lang="ru">Ernvall-Hytonen A.-M.;Matala-aho T.;Seppala I. 2023. “ Euler’s factorial series, Hardy integral,</mixed-citation><mixed-citation xml:lang="en">Ernvall-Hytonen A.-M.;Matala-aho T.;Seppala I. 2023. “ Euler’s factorial series, Hardy integral,</mixed-citation></citation-alternatives></ref><ref id="cit103"><label>103</label><citation-alternatives><mixed-citation xml:lang="ru">and continued fractions“, J.Number Theory, Vol. 244, pp.224-250.</mixed-citation><mixed-citation xml:lang="en">and continued fractions“, J.Number Theory, Vol. 244, pp.224-250.</mixed-citation></citation-alternatives></ref></ref-list><fn-group><fn fn-type="conflict"><p>The authors declare that there are no conflicts of interest present.</p></fn></fn-group></back></article>
