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Kazakh Mathematical Journal

“Analysis and Applied Mathematics” Еженедельный онлайн семинар 6

Analysis & PDE Center, Ghent University, Ghent, Belgium

 Institute Mathematics & Math. Modeling, Almaty, Kazakhstan

 “Analysis and Applied Mathematics”

Weekly Online Seminar
 

DateTuesday, March 29, 2022

 

Time: 14.00-15.00 (GMT+3, Istanbul13.00-14.00 (Ghent) 17.00-18.00 (Almaty)

Zoom linkhttps://us02web.zoom.us/j/6678270445?pwd=SFNmQUIvT0tRaHlDaVYrN3l5bzJVQT09,

Conference ID: 667 827 0445Access code: 1

Speaker: Prof. Dr. Ravshan Ashurov

Institute of Mathematics & National University of Uzbekistan, Tashkent, Uzbekistan

Title: Solution of the problem of generalized localization for spherical partial sums of multiple Fourier series

Abstract: It is well known that Luzin’s conjecture has a positive solution in one dimensional case and it is still open in multidimensional case for the spherical partial sums.
Historically progress with solving the Luzin’s conjecture has been made by considering easier problems. One of such easier problems for 
was suggested by V. A. Il’in in 1968 and this
problem is called the generalized localization principle for the spherical partial sums.
Recently, the problem of generalized localization was completely solved in papers [1] and [2].
In this talk we first give a short survey on convergence a.e. of one dimensional and multidimensional
Fourier series, then indicate a sketch of the above mentioned result’s proof.
 
References:
[1] R. R. Ashurov, Generalized localization for spherical partial sums of multiple Fourier
series, J. Fourier Anal. Appl., 25 (2019), 3174–3183.
[2] R. R. Ashurov, Generalized Localization for Spherical Partial Sums of Multiple Fourier
Series, Dokl. Math., 100 (2019), 505-507.
 
Forthcoming talks can be found on our webpage
https://sites.google.com/view/aam-seminars
 

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