Zobrazeno 1 - 10
of 10
pro vyhledávání: '"A. M. Olevskiĭ"'
Autor:
I. G. Bashmakova, G. V. Belyĭ, E. D. Gluskin, S. K. Godunov, A. A. Gonchar, A. M. Olevskiĭ, M. G. Peretyat′kin, A. A. Razborov, A. V. Skorokhod
This volume contains nine papers presented as 45-minute or one-hour addresses at the International Congress of Mathematicians in Berkeley in 1986. In the original proceedings volume of ICM-86, published by the AMS in 1988, these papers appeared in th
Autor:
A. M. Olevskiĭ
Publikováno v:
Nine Papers from the International Congress of Mathematicians 1986. :51-64
Autor:
A. M. Olevskiĭ
Publikováno v:
Thirteen Papers on Algebra and Analysis. :217-263
Autor:
A M Olevskiĭ
Publikováno v:
Mathematics of the USSR-Izvestiya. 4:811-834
In this article we prove the existence of points of local instability of the Schmidt orthogonalization operator and classify them. We establish the quadratic stability of this operator in a neighborhood of a fixed point.
Autor:
A. M. Olevskiĭ
Publikováno v:
Nine Papers on Functional Analysis and Partial Differential Equations. :83-134
Autor:
A. M. Olevskiĭ
Publikováno v:
American Mathematical Society Translations: Series 2. :91-138
Autor:
A M Olevskiĭ
Publikováno v:
Mathematics of the USSR-Sbornik. 6:233-239
Autor:
A M Olevskiĭ
Publikováno v:
Mathematics of the USSR-Sbornik. 20:145-153
We prove the following theorem. Theorem. For any there exists a complete uniformly bounded orthonormal system having the following properties: 1. For all p_0$ SRC=http://ej.iop.org/images/0025-5734/20/1/A08/tex_sm_1863_img3.gif/>, the Fouries series