Azərbaycan Respublikası Elm və Təhsil Nazirliyi
Riyaziyyat və Mexanika İnstitutu

Elan

Riyaziyyat və Mexanika İnstitutunun təşkilatçılığı ilə XIII əsrdə yaşamış dahi Azərbaycan alimi və mütəfəkkiri Nəsirəddin Tusinin xatirəsinə həsr olunmuş “XI Riyaziyyat və Mexanikanın Müasir Problemləri” adlı Beynəlxalq elmi konfrans keçiriləcəkdir.
Konfransın 03-06 iyul 2024 cü il Bakı şəhərində keçirilməsi nəzərdə tutulur.

Həsənov Cavanşir Cavad oğlu

19/11/2014

Son beş ildə çap olunmuş əsas elmi işlərinin siyahısı

  1. Hasanov J.J., Guliev V.S., Narimanov A.Ch. Some inequality for anisotropic B-makcimal function and for anisotropic B-potential Riesz. Trans. Acad. Sci. Azerb. Ser. Phys.-Tech. Math. Sci. 4 (1996), Math. Mech., 18-24. (Russian)
  2. Guliev V.S., Gasanov D.D. B-Potential Riesz on the space Гpθγ(R+n,φ). Trans. Internat. Conference “Function space. Differential operator. Vestnik Russian Peoples Friendship University, 1998, v.6, № 1, p.184-188.
  3. Gasanov D.D. The Riesz -potential in space Г*pθγ(R+n,φ). Proc. Inst. Math. Mech. Acad. Sci. Azerb. 9 (1998), p.39-43.
  4. Guliev V.S., Hasanov J.J. Some property anisotropic potential Riesz-Bessel-Fure. Vestnik Russian Universitet Friendship People, 1999, v.6, № 1, p.63-82. (Russian)
  5. Gasanov D.D. Embedding theorems in anisotropic weight type Bn-Sobolev space. Trans. Acad. Sci. Azerb. Ser. Phys.-Tech. Math. Sci. 22 (2002), № 4, Math. Mech., 69-74.
  6. Гасанов Д.Д. Предельная теорема вложений в анизотропных типа весовых Bn-пространствах Соболева. ATU, Elmi əsərlər-Fundamental elmlər. №2, cild IV(14), 2005, s.63-68.
  7. Hasanov J.J. Some property for anisotropic Riesz potential, associated with the Laplace-Bessel differential operator. Khazar Journal of Mathematics. 2006, v.2, №1, p.23-30.
  8. Guliev V.S., Hasanov J.J. Sobolev-Morrey type inequality for Riesz potentials, associated with the Laplace-Bessel differential operator. Fractional Calculus and Applied Analysis. 9 (2006), 1, 17-32.
  9. Hasanov J.J. Necessary and sufficient conditions for boundedness of the Bn-Riesz potential in Bn-Morrey spaces. Khazar Journal of Mathematics. 2006, v.2, №2, p. 75-80.
  10. Hasanov J.J. Some embedding theorems on the anisotropic Sobolev-Morrey spaces, associated with the Laplace-Bessel differential operator. Khazar Journal of Mathematics. 2006, v.2, №3, p. 35-54.
  11. Hasanov J.J. Some embedding theorems on the anisotropic Sobolev-Morrey spaces, associated with the Laplace-Bessel differential operator. Proc. of the Mathematics and Mechanics Institute of NAS of Azerb. Embeding theorems. Harmonic Analysis. 2007, Issuse XIII p.223-243.
  12. Hasanov J.J., Zeren Yusuf, On limiting case of the Sobolev theorem for B-Riesz potential in -Morrey spaces. Arab J. Math. Sci. 13 (2007), 27-38.
  13. Hasanov J.J., Narimanov A.Kh. The boundedness of the B-Riesz potential in the B-Morrey spaces. Sarajevo Journal of Mathematics. Sarajevo Journal of Mathematics v. 4 (16) (2008), 97-107.
  14. Almeida A., Hasanov J.J., Samko S.G., Maximal and potential operators in variable exponent Morrey spaces. Georgian Mathematical Journal 15 (2008), №2, 195-208.
  15. Guliev V.S., Hasanov J.J. Necessary and sufficient conditions for the boundedness of B-Riesz potential in the B-Morrey spaces. J. Math. Anal. Appl. 347 (2008) 113–122.
  16. Hasanov J.J. A note on anisotropic potentials, associated with the Laplace-Bessel differential operator. Operators and Matrices, 2(2008), №4, 465–481
  17. Guliev V.S., Hasanov J.J., Zeren Yusuf, On limiting case for boundedness of the B-Riesz potential in the B-Morrey spaces. Analysis Mathematica, 35(2009), 87-97.
  18. Guliev Y.Y., Hasanov J.J., Ismail Ekincioglu, On limiting case of the Sobolev theorem for B-Riesz potential in modified B-Morrey spaces. Complex Variables and Elliptic Equations Vol. 55, No. 8–10, August–October 2010, 865–873
  19. Guliev V.S., Hasanov J.J., Samko S.G., Boundedness of the maximal, potential and singular operators in the generalized variable exponent Morrey spaces. Mathematica Scandinavica, 107 (2010), no. 2, 1-16.
  20. Guliev V.S., Hasanov J.J., Samko S.G., Boundedness of the maximal, potential and singular integral operators in the generalized variable exponent Morrey type spaces. Journal of Mathematical Sciences, 170 (2010), no. 4, 423-443.
  21. Guliev V.S., Hasanov J.J., Samko S.G., Boundedness of the maximal, potential and singular operators in the generalized variable exponent doubling Morrey spaces. Maximal, potential and singular operators in the local ”complementary” variable exponent Morrey type spaces. Journal of Mathematical Analysis and Applications, 401(1) 2013, 72-84. http://dx.doi.org/10.1016/j.jmaa.2012.03.041
  22. Guliev Y.Y., Hasanov J.J., The boundedness of B-Riesz potential in weighted modified B-Morrey spaces. Trans. of Nat. Acad. Sci. of Azerb., 2013, v. XXXIII, No 4. p. 85-94.
  23. Hasanov J.J., Ф-Admissible sublinear singular operators and generalized Orlicz-Morrey spaces. Hindawi Publishing Corporation Journal of Function Spaces Volume 2014, Article ID 505237, 7 pages http://dx.doi.org/10.1155/2014/505237
  24. Hasanov J.J., Hardy-Littlewood-Stein-Weiss inequality in the variable exponent Morrey spaces. Pros. of Nat. Acad. Sci. of Azerb., 2013, v.XXXIX(XLVII), pp. 47-62.
  25. Guliev V.S., F. Deringoz , Hasanov J.J., Ф-admissible singular operators and their commutators on vanishing generalized Orlicz-Morrey spaces. Journal of Inequalities and Applications, 2014, 2014:143.
  26. Guliev Y.Y., Hasanov J.J., The boundedness of modified B-Riesz potential in weighted B-Morrey spaces. Scientific works. The series of physical, mathematical and technical sciences, Nakhchivan-2014, No3(59), p. 30-36.
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