Add to ORKGThis work was intended as an attempt to extend the results on localization of Fourier-Laplace series to the spectral expansions of distributions on the unit sphere. It is shown that the spectral expansions of the distribution on the unit sphere can be represented in terms of decompostions of Laplace-Beltrami operator. It was of interest to establish sufficient conditions for localization of the spectral expansions of distribution to clarify the latter some relevant counter examples are indicated
This article investigates a function f(x), constructed from the Nikol’skii class in S2. The estimati...
Fourier analysis has many applications in various science and technology. In most problem researcher...
Fourier analysis has many applications in various science and technology. In most problem researcher...
In this work we investigate the localization principle of the Fourier-Laplace series of the distribu...
In this work we investigate the localization principle of the Fourier-Laplace series of the distrib...
In this work we investigate the localization principle of the Fourier-Laplace series of the distrib...
This work was intended as an attempt to extend the results on localization of Fourier-Laplace series...
The reconstruction of functions from its expansions is a prominent problem in harmonic analysis. The...
In this paper we study the general localization principle for Fourier–Laplace series on unit sphere ...
In this paper we deal with the problems of the weak localization of the eigenfunction expansions rel...
In this paper the localization properties of the spectral expansions of distributions related to th...
In this work the spectral expansions of the distributions connected with Schrodinger operator are i...
AbstractIn this work the spectral expansions of the distributions connected with Schrödinger’s opera...
In this paper we deal with the problems of the weak localization of the eigenfunction expansions rel...
In this paper we prove precise conditions of the summability and eqiu-summability of the spectral...
This article investigates a function f(x), constructed from the Nikol’skii class in S2. The estimati...
Fourier analysis has many applications in various science and technology. In most problem researcher...
Fourier analysis has many applications in various science and technology. In most problem researcher...
In this work we investigate the localization principle of the Fourier-Laplace series of the distribu...
In this work we investigate the localization principle of the Fourier-Laplace series of the distrib...
In this work we investigate the localization principle of the Fourier-Laplace series of the distrib...
This work was intended as an attempt to extend the results on localization of Fourier-Laplace series...
The reconstruction of functions from its expansions is a prominent problem in harmonic analysis. The...
In this paper we study the general localization principle for Fourier–Laplace series on unit sphere ...
In this paper we deal with the problems of the weak localization of the eigenfunction expansions rel...
In this paper the localization properties of the spectral expansions of distributions related to th...
In this work the spectral expansions of the distributions connected with Schrodinger operator are i...
AbstractIn this work the spectral expansions of the distributions connected with Schrödinger’s opera...
In this paper we deal with the problems of the weak localization of the eigenfunction expansions rel...
In this paper we prove precise conditions of the summability and eqiu-summability of the spectral...
This article investigates a function f(x), constructed from the Nikol’skii class in S2. The estimati...
Fourier analysis has many applications in various science and technology. In most problem researcher...
Fourier analysis has many applications in various science and technology. In most problem researcher...