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Совместный общематематический семинар СПбГУ и Пекинского Университета
2 июня 2020 г. 15:00, г. Санкт-Петербург, online
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Spectral synthesis for systems of exponentials and reproducing kernels
A. D. Baranov St. Petersburg State University
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Количество просмотров: |
Эта страница: | 257 |
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Аннотация:
Let $x_n$ be a complete and minimal system of vectors in a Hilbert space $H$. We say
that this system is hereditarily complete or admits spectral synthesis if any vector in $H$
can be approximated in the norm by linear combinations of partial sums of the Fourier
series with respect to $x_n$. It was a long-standing problem whether any complete and
minimal system of exponentials in $L^2(-a,a)$ admits spectral synthesis. Several years ago
Yu. Belov, A. Borichev and myself gave a negative answer to this question which implies,
in particular, that there exist non-harmonic Fourier series which do not admit a linear
summation method. At the same time we showed that any exponential system admits the
synthesis up to a one-dimensional defect. In the talk we will also discuss related problems
for systems of reproducing kernels in Hilbert spaces of entire functions (such as PaleyWiener or Fock).
Язык доклада: английский
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