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THE ASYMPTOTIC ANALYSIS OF A CLASS OF SELF-ADJOINT SECOND-ORDER DIFFERENCE EQUATIONS: JORDAN BOX CASE

Published online by Cambridge University Press:  01 January 2009

WOJCIECH MOTYKA
WOJCIECH MOTYKA*
Affiliation:
Institute of Mathematics, Polish Academy of Sciences, ul. Św. Tomasza 30, 31-027 Kraków, Poland e-mail: namotyka@cyf-kr.edu.pl
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Abstract

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In this paper, we are computing asymptotic formulas for a base of solutions of the second-order difference equations in the double root case. Two methods are presented.

Keywords

39A1047B25
Type
Research Article
Information
Glasgow Mathematical Journal , Volume 51 , Issue 1 , January 2009 , pp. 109 - 125
Copyright
Copyright © Glasgow Mathematical Journal Trust 2008

References

REFERENCES

1.Elaydi, S. N., An introduction to difference equations (Springer Verlag New York, 1999).CrossRefGoogle Scholar
2.Hall, L. M. and Trimble, S. Y., Asymptotic behavior of solutions of Poincare difference equations, in Proceedings of the International Conference of Theory and Applications of Differential Equations (Aftabizadeh, A.R., editor) (Ohio University, Ohio, 1988), 412–416.Google Scholar
3.Janas, J., The asymptotic analysis of generalized eigenvectors of some Jacobi operators. Jordan box case, J. Difference Eq. Appl. 12 (6) (2006), 597618.CrossRefGoogle Scholar
4.Janas, J. and Naboko, S., Spectral properties of selfadjoint Jacobi matrices coming from birth and death processes, Operator Theory: Adv. Appl. 127 (2001), 387397.Google Scholar
5.Janas, J., Naboko, S. and Sheronova, E., Asymptotic behavior of generalized eigenvectors of Jacobi matrices in the critical (“double root”) case, (in press).Google Scholar
6.Kelley, W., Asymptotic analysis of solutions in the “Double Root” case, Comput. Math. Appl. 28 (1994), 167173.CrossRefGoogle Scholar
7.Khan, S. and Pearson, D. B., Subordinacy and spectral theory for infinite matrices, Helv. Phys. Acta 65 (1992), 505527.Google Scholar
8.Kooman, R. J., Asymptotic behavior of solutions of linear recurrences and sequences of Möbius-transformations, J. Approx. Theory 93 (1998), 158.CrossRefGoogle Scholar
9.Simonov, S., An example of spectral phase transition phenomenon in a class of Jacobi matrices with periodically modulated weights, Operator Theory: Adv. Appl. 174 (2007), 187203.Google Scholar