Search

Your search keyword '"HASANOV, ANVAR"' showing total 106 results
Start Over Author "HASANOV, ANVAR"
106 results on '"HASANOV, ANVAR"'

1. On generalized Mittag-Leffler-type functions of two variables

Author

Hasanov, Anvar and Karimov, Erkinjon

Subjects
Mathematics - Classical Analysis and ODEs, Mathematics - Analysis of PDEs, 33E12, 33C60, 26A33, 47B38
Abstract

We aim to study Mittag-Leffler type functions of two variables ${{D}_{1}}\left( x,y \right),...,{{D}_{5}}\left( x,y \right)$ by analogy with the Appell hypergeometric functions of two variables. Moreover, we targeted functions ${{E}_{1}}\left( x,y \right),$ $...,{{E}_{10}}\left( x,y \right)$ as limiting cases of the functions ${{D}_{1}}\left( x,y \right),$ $...,{{D}_{5}}\left( x,y \right)$ and studied certain properties, as well. Following Horn's method, we determine all possible cases of the convergence region of the function ${{D}_{1}}\left( x,y \right).$ Further, for a generalized hypergeometric function, ${{D}_{1}}\left( x,y \right)$ (two variable Mittag-Leffler-type function) integral representations of the Euler type have been proved. One-dimensional and two-dimensional Laplace transforms of the function are also defined. We have constructed a system of partial differential equations which is linked with the function ${{D}_{1}}\left( x,y \right)$., Comment: 16 pages

Published
2025

3. INFINITE SUMMATION FORMULAS FOR TRIPLE LAURICELLA HYPERGEOMETRIC FUNCTIONS

Author

Hasanov, Anvar and Ergashev, Tuhtasin G.

Subjects
Stochastic processes, Differential equations, Mathematics
Abstract

Inspired by the work by Brychkov and Saad who gave infinite summation formulas for Appell functions (of two variables) with the help of summation theorems, we, using a new inverse pair of symbolic operators, establish infinite summation formulas for four Lauricella functions of three variables. As an application of the results obtained, we present integral representation formulas. Bibliography:30titles., 1 Introduction and Definitions Hypergeometric functions of one and more variables naturally occur in a wide variety of problems in applied mathematics, statistics, operations research, theoretical physics, and engineering sciences. [...]

Published
2023
Full Text
View/download PDF

4. Self-similar solutions of some model degenerate partial differential equations of the second, third and fourth order

Author

Ruzhansky, Michael and Hasanov, Anvar

Subjects
Mathematics - Classical Analysis and ODEs, Mathematics - Analysis of PDEs
Abstract

When studying boundary value problems for some partial differential equations arising in applied mathematics, we often have to study the solution of a system of partial differential equations satisfied by hypergeometric functions and find explicit linearly independent solutions for the system. In this study, we construct self-similar solutions of some model degenerate partial differential equations of the second, third, and fourth order. These self-similar solutions are expressed in terms of hypergeometric functions., Comment: 13 pages; to appear in LOBACHEVSKII JOURNAL OF MATHEMATICS

Published
2020

5. Double-Layer Potentials for a Generalized Bi-Axially Symmetric Helmholtz Equation II

Author

Berdyshev, Abdumauvlen, Hasanov, Anvar, and Ergashev, Tuhtasin

Subjects
Mathematics - Analysis of PDEs
Abstract

The double-layer potential plays an important role in solving boundary value problems for elliptic equations. All the fundamental solutions of the generalized bi-axially symmetric Helmholtz equation were known, and only for the first one was constructed the theory of potential. Here, in this paper, we aim at constructing theory of double-layer potentials corresponding to the next fundamental solution. By using some properties of one of Appell's hypergeometric functions in two variables, we prove limiting theorems and derive integral equations concerning a denseness of double-layer potentials., Comment: 10 pages. arXiv admin note: substantial text overlap with arXiv:0810.3979

Published
2018

6. Mittag‐Leffler type functions of three variables.

Author

Hasanov, Anvar and Yuldashova, Hilola

Subjects
*FRACTIONAL differential equations, *PARTIAL differential equations, *INTEGRAL representations, *INTEGRAL functions, *GENERALIZATION, *FRACTIONAL calculus, *HYPERGEOMETRIC functions
Abstract

In this article, we generalized Mittag‐Leffler‐type functions F¯A(3),F¯B(3),F¯C(3)$$ {\overline{F}}_A^{(3)},{\overline{F}}_B^{(3)},{\overline{F}}_C^{(3)} $$, and F¯D(3)$$ {\overline{F}}_D^{(3)} $$, which correspond, respectively, to the familiar Lauricella hypergeometric functions FA(3),FB(3),FC(3)$$ {F}_A^{(3)},{F}_B^{(3)},{F}_C^{(3)} $$, and FD(3)$$ {F}_D^{(3)} $$ of three variables. Initially, from the Mittag‐Leffler type function in the simplest form to the functions we are studying, necessary information about the development history, study, and importance of this and hypergeometric type functions will be introduced. Among the various properties and characteristics of these three‐variable Mittag‐Leffler‐type function F¯D(3)$$ {\overline{F}}_D^{(3)} $$, which we investigate in the article, include their relationships with other extensions and generalizations of the classical Mittag‐Leffler functions, their three‐dimensional convergence regions, their Euler‐type integral representations, their Laplace transforms, and their connections with the Riemann‐Liouville operators of fractional calculus. The link of three‐variable Mittag‐Leffler function with fractional differential equation systems involving different fractional orders is necessary on certain applications in physics.Therefore, we provide the systems of partial differential equations which are associated with them. [ABSTRACT FROM AUTHOR]

Published
2025
Full Text
View/download PDF

7. Decompositions for hypergeometric function $H_A, H_B,H_C$

Author

Hasanov, Anvar H., Seilkhanova, Rakhila B., and Seilova, Roza D.

Subjects
Mathematics - Analysis of PDEs, 33C20
Abstract

With the help of some techniques based on certain inverse pairs of symbolic operators, the authors investigated several decomposition formulas associated with Srivastava's Hypergeometric functions of three variables. Some operator identities have been constructed in this matter. With the help these operator forms 15 decompositions are found which are expressed through product of Hypergeometric Gauss and Appell's functions., Comment: 18 pages

Published
2015

8. The Dirichlet problem for the generalized bi-axially symmetric Helmholtz equation

Author

Salakhitdinov, M. S. and Hasanov, Anvar

Subjects
Mathematical Physics, 35A08
Abstract

In [18], fundamental solutions for the generalized bi-axially symmetric Helmholtz equation were constructed in $R_2^ + = \left\{ {\left( {x,y} \right):x > 0,y > 0} \right\}.$ They contain Kummer's confluent hypergeometric functions in three variables. In this paper, using one of the constructed fundamental solutions, the Dirichlet problem is solved in the domain $\Omega \subset R_2^ +.$ Using the method of Green's functions, solution of this problem is found in an explicit form., Comment: 11 pages

Published
2014

9. Linear independent solutions and operational representations for hypergeometric functions of four variables

Author

Bin-Saad, Maged G. and Hasanov, Anvar

Subjects
Mathematics - Classical Analysis and ODEs, Mathematical Physics, 33C20, 35A08
Abstract

In investigation of boundary-value problems for certain partial differential equations arising in applied mathematics, we often need to study the solution of system of partial differential equations satisfied by hypergeometric functions and find explicit linearly independent solutions for the system. Here we choose the Exton function $K_{2}$ among his 21 functions to show how to find the linearly independent solutions of partial differential equations satisfied by this function $K_{2}$. Based upon the classical derivative and integral operators we introduce a new operational images for hypergeometric function $K_{2}$. By means of these operational images a number of finite series and decomposition formulas are then fund., Comment: 8 pages

Published
2014

10. Fundamental solutions for a class of three-dimensional elliptic equations with singular coefficients

Author

Hasanov, Anvar and Karimov, E. T.

Subjects
Mathematical Physics, 35A08
Abstract

We consider an equation $$ L_{\alpha ,\beta ,\gamma} (u) \equiv u_{xx} + u_{yy} + u_{zz} + \displaystyle \frac{{2\alpha}}{x}u_x + \displaystyle \frac{{2\beta}}{y}u_y + \displaystyle \frac{{2\gamma}}{z}u_z = 0 $$ in a domain ${\bf R}_3^ + \equiv {{({x,y,z}): x > 0, y > 0, z > 0}}$. Here $\alpha ,\beta ,\gamma$ are constants, moreover $0 < 2\alpha, 2\beta, 2\gamma < 1$. Main result of this paper is a construction of eight fundamental solutions for above-given equation in an explicit form. They are expressed by Lauricella's hypergeometric functions with three variables. Using expansion of Lauricella's hypergeometric function by products of Gauss's hypergeometric functions, it is proved that the found solutions have a singularity of the order $1/r$ at $r \to 0$., Comment: 9 pages

Published
2009

12. Double-Layer Potentials for a Generalized Bi-Axially Symmetric Helmholtz Equation

Author

Srivastava, H. M., Choi, Junesang, and Hasanov, Anvar

Subjects
Mathematics - Analysis of PDEs, Mathematical Physics, 35J15, 35J70, 58J10, 58J20
Abstract

The double-layer potential plays an important r$\hat{\rm o}$le in solving boundary value problems of elliptic equations. Here, in this paper, we aim at introducing and investigating double layer potentials for a generalized bi-axially symmetric Helmholtz equation. By using some properties of one of Appell's hypergeometric functions in two variables, we prove limiting theorems and derive integral equations concerning a denseness of double-layer potentials., Comment: 13

Published
2008

13. SURXONDARYO VILOYATINING IQTISODIY GEOGRAFIK TAVSIFI

Author

Olimqulov Yashnar Maxmadamin O`G`Li1, Hasanov Anvar Zikriyo O`G`Li2

Subjects
Mazkur maqolada O'zbekiston respublikasining eng janubiy qismida joylashgan Surxondaryo viloyati, xizmat ko`rsatish sohalar, dunyo hamjamiyatida tutgan nufuzi, bozor, urbanizatsiyasi, shahar va qishloq joylarda xizmat ko`rsatish tarkibi, shaxarlar soni haqida so'z boradi. Xizmat ko`rsatish jarayonining bugungi kundagi holati, takliflar, e'tibor qaratilishi lozim bo'lgan jihatlar yoritilgan
Abstract

Mazkur maqolada O’zbekiston respublikasining eng janubiy qismida joylashgan Surxondaryo viloyati, xizmat ko`rsatish sohalar, dunyo hamjamiyatida tutgan nufuzi, bozor, urbanizatsiyasi, shahar va qishloq joylarda xizmat ko`rsatish tarkibi, shaxarlar soni haqida so’z boradi. Xizmat ko`rsatish jarayonining bugungi kundagi holati, takliflar, e’tibor qaratilishi lozim bo’lgan jihatlar yoritilgan. &nbsp

Published
2023
Full Text
View/download PDF

14. KICHIK YOSHDAGI VOLEYBOLCHILARDA CHAQQONLIK SIFATLARINI RIVOJLANTIRISHDA NOAN'ANAVIY O'YIN MASHQLARIDAN FOYDALANISH SAMARADORLIGI

Author

Hasanov Anvar Toxirovich

Subjects
kichik yoshdagi voleybolchilar, chaqqonlik sifatlari, noan'anaviy o'yin mashqlar, dastlabki tayyorlash, jismoniy mashqlar
Abstract

Ushbu maqolada kichik yoshdagi voleybolchilarda chaqqonlik sifatlarini rivojlantirishda noan’anaviy o‘yin mashqlaridan foydalanish samaradorligi, jumladan sportchilarni dastlabki tayyorlash bosqichida sport mahoratini poydevori bo‘lmish jismoniy sifatlarni rivojlantirish uslubiyati aksariyat hollarda umumiy yoki maxsus jismoniy mashqlarni qo‘llash ustunligiga asoslanganligi haqida fikr mulohazalar bildirilgan., {"references":["1.\tUsmonxodjaev T.S. va boshqalar. Bolalar va o'smirlar sporti mashg'ulotlari nazariyasi va uslubiyatlari. 2005 y. Toshkent. 2.\tAyrapetyants L.R., Pulatov A.A., Isroilov Sh.X. Voleybol. // Oliy o'quv yurtlari umumiy kurs talabalari uchun o'quv qo'llanma. –T., 2009. – 77 b. 3.\tAyrapetyants L.R., Pulatov A.A. Voleybol nazariyasi va uslubiyati. // Oliy o'quv yurtlari uchun darslik. –T.: \"Fan va texnologiya\", 2012. – 208 b. 4.\tA.T.Hasanov va R.M.Toshpo'latov 2022. UMUMIY O'RTA TA'LIM MAKTABLARDA Jismoniy tarbiya VA SPORTNI RIVOJLANISH METODIKASINI TAKMORLASH. Akademik tadqiqotlar va ta'lim fanlari tendentsiyalari jurnali . 1, 7 (2022 yil iyun), 95–99. 5.\tHasanov AT, Mamanazarova AB OILADA BOLALARNI SOG'lom turmush tarzini shakllantirish USULLARI //O'quv fanlaridagi akademik tadqiqotlar va tendentsiyalar jurnali. – 2022. – T. 1. – №. 7. – S. 6-9. 6.\tHasanov A. T., Mamanazarova A. B. WRESTLING PREPARATION PROCESS IN SPORTS SCHOOLS //Spectrum Journal of Innovation, Reforms and Development. – 2022. – Т. 3. – С. 174-176. 7.\tHasanov, A. T., S. D. Akzamov, and D. T. Abduraimov. \"Pedagogical technology in professional-practical physical training of students of the faculty of military education.\" INTERNATIONAL JOURNAL OF RESEARCH IN COMMERCE, IT, ENGINEERING AND SOCIAL SCIENCES ISSN: 2349-7793 Impact Factor: 6.876 16.10 (2022): 148-156. 8.\tHasanov A. Primary school students training movement games in physical education classes: primary school students training movement games in physical education classes //Физическое воспитание, спорт и здоровье. – 2022. – Т. 2. – №. 2."]}

Published
2023
Full Text
View/download PDF

15. YOSH VOLEYBOLCHILARNI JISMONIY RIVOJLANISHINI O'RGANISH

Author

Hasanov Anvar Toxirovich

Subjects
yosh voleybolchilar, jismoniy tarbiyalash, yugurish,sakrash, sinfdan tashqari ishlarni rejalashtirish
Abstract

Umumta’lim maktablarda yosh voleybolchilarni tayyorlashning nazariy va amaliy masalalari, zamonaviy voleybol va uning dolzarb masalalari, voleybol sport to‘garaklari va musobaqalarini tashkil qilish va o‘tkazishning o‘ziga xos xususiyatlari haqida ilmiy ish olib borilgan., {"references":["1.\tO'zbekiston Respublikasi Prezidenti Shavkat Mirziyoev tomonidan 2017 yil 7 fevraldagi PF-4947 sonli \"2017 – 2021 yillarda O'zbekistonni rivojlantirishning beshta ustuvor yo'nalishi bo'yicha Harakat strategiyasi\" haqidagi farmoni. 2.\tPulatov A.A. Ummatov A.A. Voleybol musobaqa o'tkazish tartibi va qoidalari. –T.: \"Ilmiy texnika axborot-press\", 2018. 3.\t Goncharova O.V., Qipchoqov B.B., Boltayev Z.B. Voleybol. –T.: \"lider Press\", 2008. 4.\t Boltayev Z.B. Voleybol sport turlari nazariyasi va uslubiyati fanidan ma'ruza matni. –T., 2017. 5.\tA.T.Hasanov va R.M.Toshpo'latov 2022. UMUMIY O'RTA TA'LIM MAKTABLARDA Jismoniy tarbiya VA SPORTNI RIVOJLANISH METODIKASINI TAKMORLASH. Akademik tadqiqotlar va ta'lim fanlari tendentsiyalari jurnali . 1, 7 (2022 yil iyun), 95–99. 6.\tHasanov AT, Mamanazarova AB OILADA BOLALARNI SOG'lom turmush tarzini shakllantirish USULLARI //O'quv fanlaridagi akademik tadqiqotlar va tendentsiyalar jurnali. – 2022. – T. 1. – №. 7. – S. 6-9. 7.\tHasanov A. T., Mamanazarova A. B. WRESTLING PREPARATION PROCESS IN SPORTS SCHOOLS //Spectrum Journal of Innovation, Reforms and Development. – 2022. – Т. 3. – С. 174-176. 8.\tHasanov, A. T., S. D. Akzamov, and D. T. Abduraimov. \"Pedagogical technology in professional-practical physical training of students of the faculty of military education.\" INTERNATIONAL JOURNAL OF RESEARCH IN COMMERCE, IT, ENGINEERING AND SOCIAL SCIENCES ISSN: 2349-7793 Impact Factor: 6.876 16.10 (2022): 148-156. 9.\tHasanov A. Primary school students training movement games in physical education classes: primary school students training movement games in physical education classes //Физическое воспитание, спорт и здоровье. – 2022. – Т. 2. – №. 2."]}

Published
2023
Full Text
View/download PDF

16. 11-15 YOSHLI SUZUVCHILARNING MASHG'ULOT YUKLAMALARINI REJALASHTIRISH XUSUSIYATLARI

Author

Hasanov Anvar Toxirovich and Asqarova Zaynura

Subjects
Yosh suzuvchilar, jismoniy tarbiyalash,texnik-taktik tayyorgarlik, suzish, musobaqa
Abstract

Bolalar o‘smirlar sport maktablari tarbiyalanuvchilari mashg‘ulot yuklamalarini rejalashtirish tayyorgarligini interfaolmetodlar orqali takomillashtirishdan iborat., {"references":["1.\tСобирова О.А. Сузиш. Т., Ибн Сино, 1993 2.\t Содиқов А.Ғ Планирование тренировочнқх нагрузок избранной направленности в спортивном плавании . \\ Tошкент, ЎзДЖТИ, 2008г. 3.\tСодиқов А.Ғ . Интесификация процесса юных пловцов учебно тренировочных групп . 13 – 15 лет \\ дисс. Кaнд. пeд. наук – T., 2009 4.\tA.T.Hasanov va R.M.Toshpo'latov 2022. UMUMIY O'RTA TA'LIM MAKTABLARDA Jismoniy tarbiya VA SPORTNI RIVOJLANISH METODIKASINI TAKMORLASH. Akademik tadqiqotlar va ta'lim fanlari tendentsiyalari jurnali . 1, 7 (2022 yil iyun), 95–99. 5.\tHasanov AT, Mamanazarova AB OILADA BOLALARNI SOG'lom turmush tarzini shakllantirish USULLARI //O'quv fanlaridagi akademik tadqiqotlar va tendentsiyalar jurnali. – 2022. – T. 1. – №. 7. – S. 6-9. 6.\tHasanov A. T., Mamanazarova A. B. WRESTLING PREPARATION PROCESS IN SPORTS SCHOOLS //Spectrum Journal of Innovation, Reforms and Development. – 2022. – Т. 3. – С. 174-176. 7.\tHasanov, A. T., S. D. Akzamov, and D. T. Abduraimov. \"Pedagogical technology in professional-practical physical training of students of the faculty of military education.\" INTERNATIONAL JOURNAL OF RESEARCH IN COMMERCE, IT, ENGINEERING AND SOCIAL SCIENCES ISSN: 2349-7793 Impact Factor: 6.876 16.10 (2022): 148-156. 8.\tHasanov A. Primary school students training movement games in physical education classes: primary school students training movement games in physical education classes //Физическое воспитание, спорт и здоровье. – 2022. – Т. 2. – №. 2."]}

Published
2023
Full Text
View/download PDF

19. METHODOLOGICAL QUESTIONS OF THE NATURAL GEOGRAPHICAL REGION OF THE TERRITORY OF UZBEKISTAN

Author

Olimqulov Yashnar Maxmadamin o'g'li,Xo'shboqova Mehriniso Gulmurod qizi,Hasanov Anvar Zikriyo o'g'li

Subjects
complex natural-geographical zoning, natural-geographical region, country, province, sub-province, region, landscape, scheme of taxonomic units
Abstract

The article is devoted to the main issues of natural-geographical zoning of the territory of Uzbekistan, the principles of territorial division. General information about the division and study of complex natural-geographical zoning (into schemes of taxonomic units) of the territory of our republic is given., "Science and innovation" international scientific journal. ISSN: 2181-3337

Published
2022
Full Text
View/download PDF

20. Generalized hypergeometric function and its applications to solving the equation of a beam with variable height by the Kelvin-Voight model.

Author

Hasanov, Anvar and Vahobov, Valijon

Subjects
*HYPERGEOMETRIC functions, *HYPERGEOMETRIC series, *REPRESENTATION theory, *QUANTUM field theory, *QUANTUM groups, *EQUATIONS
Abstract

In this work we begin with a brief survey of the generalization of various Gaussian series introduced so far. One dimensional Gaussian series is Hypergeometric functions of several variables arise in quantum field theory as solutions of the Knizhnik-Zamolodchikov equations. These equations can be considered as generalized equations of hypergeometric type, and their solutions admit integral representations that generalize the classical Euler integrals for hypergeometric functions of one variable. Such an approach allows to connect special functions of the hypergeometric type with topical problems in the theory of representations of Lie algebras and quantum groups. [ABSTRACT FROM AUTHOR]

Published
2023
Full Text
View/download PDF

21. Fundamental solutions of a class of degenerate elliptic equation.

Author

Baishemirov, Zharasbek, Berdyshev, Abdumauvlen, and Hasanov, Anvar

Subjects
ELLIPTIC equations, DEGENERATE differential equations, GAUSSIAN function, GREEN'S functions, HYPERGEOMETRIC functions
Abstract

In this paper, for the elliptic equation with two lines of different order of degeneration, given in the first quarter of the plane (x,y)$$ \left(x,y\right) $$, four fundamental solutions are constructed that are expressed by Appell's hypergeometric functions F2$$ {F}_2 $$ of two variables. By means the decomposition formula of the Appell's function in products of the Gauss hypergeometric function, it is proved that the constructed fundamental solutions possess a logarithmic singularity for r→0$$ r\to 0 $$. [ABSTRACT FROM AUTHOR]

Published
2023
Full Text
View/download PDF

24. SOLUTIONS TO A SYSTEM OF HYPERGEOMETRIC TYPE DIFFERENTIAL EQUATIONS IN PARTIAL DERIVATIVES OF THE THIRD ORDER AND ITS INTEGRAL REPRESENTATIONS - РЕШЕНИЯ СИСТЕМЫ ДИФФЕРЕНЦИАЛЬНЫХ УРАВНЕНИЙ ГИПЕРГЕОМЕТРИЧЕСКОГО ТИПА В ЧАСТНЫХ ПРОИЗВОДНЫХ ТРЕТЬЕГО ПОРЯДКА И ЕГО ИНТЕГРАЛЬНЫЕ ПРЕДСТАВЛЕНИЯ

Author

Hasanov, Anvar and Kozimova, Odina

Subjects
Hypergeometric functions of several variables, system of hypergeometric equations, integral representations, linearly independent solutions, Гипергеометрические функции многих переменных, система уравнение гипергеометрического типа, интегральные представления линейно независимые решения
Abstract

This article studies the properties of the Campe de Feriet function of two arguments of the third order. Integral representations and a system of partial differential equations of hypergeometric type are proved. It is indicated that the resulting system of hypergeometric type has nine linearly independent solutions at the origin. В этой статье изучаются свойства функции Кампе де Фериет от двух аргументов третьего порядка . Доказаны интегральные представления и система дифференциальных уравнений в частных производных гипергеометрического типа. Указано, что полученная система гипергеометрического типа в начале координат имеет девять линейно независимые решения.

Published
2022
Full Text
View/download PDF

25. SOME MATHEMATICAL PROPERTIES FOR MARGINAL MODEL OF POISSON-GAMMA DISTRIBUTION.

Author

BIN-SAAD, MAGED G., YOUNIS, JIHAD A., and HASANOV, ANVAR

Subjects
LAGUERRE polynomials, GENERATING functions, DIFFERENTIAL equations, POLYNOMIALS, STATISTICAL models, POISSON'S equation
Abstract

Recently, Casadei [4] provided an explicit formula for statistical marginal model in terms of Poisson-Gamma mixture. This model involving certain polynomials which play the key role in reference analysis of the signal and background model in counting experiments. The principal object of this paper is to present a natural further step toward the mathematical properties concerning this polynomials. We Ąrst obtain explicit representations for these polynomials in form of the Laguerre polynomials and the conĆuent hyper-geometric function and then based on these representations we derive a number of useful properties including generating functions, recurrence relations, differential equation, Rodrigues formula, Ąnite sums and integral transforms. [ABSTRACT FROM AUTHOR]

Published
2023
Full Text
View/download PDF

26. Certain decomposition formulas for hypergeometric Gaussian functions in three variables.

Author

Younis, Jihad A., Hasanov, Anvar, and El Salam, Mohamed A. Abd

Subjects
GAUSSIAN function, HYPERGEOMETRIC functions, HYPERGEOMETRIC series
Abstract

In this paper, we present several operator identities by using certain inverse pairs of symbolic operators. Using the obtained operator identities, we establish many decomposition formulas for Gaussian hypergeometric functions in three variables. Furthermore, some transformation formulas are introduced. [ABSTRACT FROM AUTHOR]

Published
2023

36. Some properties relating to the Mittag–Leffler function of two variables.

Author

Bin-Saad, Maged G., Hasanov, Anvar, and Ruzhansky, Michael

Subjects
*MELLIN transform, *HYPERGEOMETRIC functions, *INTEGRAL representations, *INTEGRAL transforms, *FRACTIONAL calculus
Abstract

An attempt is made here to study the Mittag–Leffler function with two variables. Its various properties including integral and operational relationships with other known Mittag–Leffler functions of one variable, pure and differential recurrence relations, Euler transform, Laplace transform, Mellin transform, Whittaker transform, Mellin–Barnes integral representation, and its relationship with Wright hypergeometric function are investigated and established. Also, properties of the Mittag–Leffler function of two variables associated with fractional calculus operators are considered. [ABSTRACT FROM AUTHOR]

Published
2022
Full Text
View/download PDF

37. APPLICATION OF OPERATORS H(α, β AND H(α, β) TO HYPERGEOMETRIC GAUSSIAN FUNCTIONS IN THREE VARIABLES.

Author

HASANOV, ANVAR and YOUNIS, JIHAD A.

Subjects
HYPERGEOMETRIC functions, GAUSSIAN function, REAL variables, DECOMPOSITION method, TRANSFORMATION groups
Abstract

By using the reciprocally inverse operators of the Burchnall and Chaundy type introduced by Choi and Hasanov in 2011, we aim at deriving certain decomposition formulas for some Gauss's triple hypergeometric functions. We also present some transformation formulas by using our decomposition formulas. [ABSTRACT FROM AUTHOR]

Published
2020
Full Text
View/download PDF

42. Applications of symbolic operators to the Kampé de Fériets double hypergeometric series.

Author

Hasanov, Anvar, Bin-Saad, Maged G., and Seilkhanova, Rakhila B.

Subjects
HYPERGEOMETRIC series, MATHEMATICAL logic, MATHEMATICAL decomposition
Abstract

In our present investigation we propose to present certain decomposition formulas for Kampé de Fériets series of double hypergeometric series Fl:m;np:q;k. Based upon the theory of symbolic operators, we introduce a new symbolic operational images and by means of these symbolic operational images a number of decomposition formulas for Kampé de Fériets series are then found. Other closely-related special cases are also considered. [ABSTRACT FROM AUTHOR]

Published
2018

Catalog

Books, media, physical & digital resources
See catalog results