Frames from Cosines with the Degenerate Coefficients

Sadigova Sabina Rahib; Mamedova Zahira Vahid

American Journal of Applied Mathematics and Statistics. 2013, 1(3), 36-40
DOI: 10.12691/AJAMS-1-3-1

Original Research

Frames from Cosines with the Degenerate Coefficients

Sadigova Sabina Rahib^1, and Mamedova Zahira Vahid¹

¹Institute of Mathematics and Mechanics of NAS of Azerbaijan, B.Vahabzade 9, AZ1141,Baku, Azerbaijan

Pub. Date: May 10, 2013

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Cite this paper

Sadigova Sabina Rahib and Mamedova Zahira Vahid. Frames from Cosines with the Degenerate Coefficients. American Journal of Applied Mathematics and Statistics. 2013; 1(3):36-40. doi: 10.12691/AJAMS-1-3-1

Abstract

The system of cosines with a degenerate coefficient in exponential form is considered. A necessary and sufficient condition on the degree of degeneration is found that makes the considered system a frame in Lebesgue spaces. It is proved that if the degenerate coefficient satisfies the Muckenhoupt condition, then the basicity holds. If the Muckenhoupt condition does not hold, then the system has a finite defect, and does not form a frame.

Keywords

systems of cosines, degeneration, frames

Copyright

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References

[1]	Babenko K.I. On conjugated functions, DAN SSSR, vol.62, No2, 1948, pp.157-160.

[2]	Bari N.K. Trigonometric Series. Fizmatgiz, Moscow, 1961, 672 p.

[3]	Bilalov B.T., Veliyev S.G. On completeness of exponent system with complex coefficients in weight spaces. Trans. of NAS of Azerb., XXV, No 7, 2005, p. 9 - 14.

[4]	Bilalov B.T., Veliyev S.G. Bases of eigen functions of two discontinuous differential operators. Diff. Uravn. 2006, vol. 42, No 9, p. 190-192.

[5]	Christensen O. An Introduction to Frames and Riesz bases. Springer, 2003, 440 p.

[6]	Edwards R. Fourier Series in a Modern Exposition. Moscow, "Mir", vol.1, 1985, 264 p.

[7]	Edwards R. Fourier Series in a Modern Exposition. Moscow, "Mir", vol.2, 1985, 400 p.

[8]	Gaposhkin V.F. One generalization of M.Riesz theorem on conjugated functions. Mat. Sbornik, 46 (3) (88), 1958, 111-115.

[9]	Gar J. Garnett. Bounded Analytic Functions. Moscow, "Mir", 1984, 469 p.

[10]	Gohberg I.C., Krein M.G. Introduction to the theory of linear non- selfadjoint operators. Nauka", Moscow 1965 448 p.

[11]	Golubeva E.S. The System of Weighted Exponentials with Power Weights. Herald of Samara State University. Natural Sciences, 2011, No2 (83), pp.15-25.

[12]	Bilalov B.T., Guliyeva F.A. On The Frame Properties of Degenerate System of Sines, Journal of Function Spaces and Applications, Volume 2012 (2012), Article ID 184186, 12 pages.

[13]	Heil Ch. A Basis Theory Primer, Springer, 2011, 534 p.

[14]	Kazaryan K.S., Lizorkin P.I. Multipliers, bases and unconditional bases in the weighted spaces B and SB, Proc. of the Steklov Ins. of Math., 1989, 187, pp. 111-130.

[15]	Moiseev E.I. On basicity of systems of cosines and sines in weight space. Diff. Uravn., vol. 34, No.1,1998,pp. 40-44.

[16]	Moiseev E.I. The basicity in the weight space of a system of eigen functions of a differential operator. Diff. Uravn., 1999, v.35, No2, pp.200-205.

[17]	Pukhov S.S., Sedletskii A.M. Bases of exponents, sines and cosines in weight spaces on finite interval. Dokl. RAN vol. 425, 4 (2009), pp.452-455.

[18]	Zygmund A. Trigonometric series. Moscow, "Mir", vol.1, 1965, 616p.

[19]	Zygmund A. Trigonometric series. Moscow, "Mir", vol.2, 1965, 538 p.