Analogue of Men’shov’s theorem ”on correction” for discrete orthonormal systems. (English. Russian original) Zbl 0736.42006
Math. Notes 46, No. 5, 934-939 (1989); translation from Mat. Zametki 46, No. 6, 67-74 (1989).
Consider a unit vector in \(R^ n\) (\(n\) possibly large), with its components in the standard basis in \(R^ n\), and suppose that another orthonormal basis is given. The paper deals with the question of the possibility of changing a relatively small number of components of the vector in order that the “partial sums” of the vector with respect to the given basis be bounded in \(\ell^ n_ \infty\)-norm. The bound should be independent of the vector and the basis considered and scaled by \(n^{-1/2}\). Using non-trivial tools, the author shows that this is always possible, with the relative number of components on which the change is made not exceeding a prescribed arbitrarily small number. The result is an analogue of Men’shov’s theorem on Fourier series which says that any continuous function on \([0,2\pi]\) can be changed on a set of small measure in order that the Fourier series of the new function be uniformly convergent.
Reviewer: M.Šilhavý (Praha)
MSC:
| 42A20 | Convergence and absolute convergence of Fourier and trigonometric series |
| 42C15 | General harmonic expansions, frames |
Keywords:
orthonormal system; bases; partial sums; orthonormal basis; Men’shov’s theorem; Fourier seriesReferences:
| [1] | N. K. Bari, Trigonometrics Series [in Russian], Fizmatgiz, Moscow (1961). |
| [2] | A. M. Olevskii, ?Modifications of functions, and Fourier series,? Usp. Mat. Nauk,40, No. 3, 157-193 (1985). |
| [3] | B. S. Kashin, ?On some properties of the space of trigonometric polynomials related to uniform convergence,? Soobshch. Akad. Nauk Gruz. SSR,93, No. 2, 281-284 (1979). · Zbl 0422.42005 |
| [4] | G. G. Kosheleva, ?Correction of piecewise constant functions and summation of their Fourier series by Cesàro methods of negative order,? Mat. Zametki,41, No. 2, 175-184 (1987). · Zbl 0638.42008 |
| [5] | B. S. Kashin and G. G. Kosheleva, ?On a certain approach to the theorem ?on correction,?? Vestn. Mosk. Gos. Univ., Ser. 1, Mat. Mekh., No. 4, 6-9 (1988). · Zbl 0681.42004 |
| [6] | A. M. Olevskii, ?The existence of functions with unremovable Carleman singularities,? Dokl. Akad. Nauk SSSR,238, No. 4, 796-799 (1978). · Zbl 0398.42004 |
| [7] | B. S. Kashin, ?On a certain isometric operator in L2(0, 1),? C. R. l’Académie Bulgare Sci.,38, No. 12, 1613-1615 (1985). · Zbl 0664.47019 |
| [8] | B. S. Kashin, ?On unconditional convergence in the space L1,? Mat. Sb.,94, No. 5, 540-550 (1974). |
| [9] | B. S. Kashin, ?On trigonometric polynomials with the coefficients +1, ?1, 0,? Tr. Mat. Inst. Akad. Nauk SSSR,180, 131-132 (1987). |
| [10] | E. D. Gluskin, ?The extremal properties of orthogonal parallelepipeds and their applications to the geometry of Banach spaces,? Mat. Sb.,136, No. 1, 85-96 (1988). · Zbl 0648.52003 |
| [11] | B. S. Kashin and A. A. Saakyan, Orthogonal Series [in Russian], Nauka, Moscow (1984). |
| [12] | B. S. Kashin, ?On trigonometric polynomials with coefficients equal zero or unity in modulus,? in: Theory of Functions and Approximations [in Russian], Part I, Saratov Univ. (1987), pp. 19-30. |
This reference list is based on information provided by the publisher or from digital mathematics libraries. Its items are heuristically matched to zbMATH identifiers and may contain data conversion errors. In some cases that data have been complemented/enhanced by data from zbMATH Open. This attempts to reflect the references listed in the original paper as accurately as possible without claiming completeness or a perfect matching.
