Publication detail

Trigonometric Recurrence Relations and Tridiagonal Trigonometric Matrices

DOŠLÝ, O. PECHANCOVÁ, Š.

Original Title

Trigonometric Recurrence Relations and Tridiagonal Trigonometric Matrices

Type

journal article - other

Language

English

Original Abstract

It is shown that every tridiagonal symmetric matrix can be transformed by a special transformation into the so-called tridiagonal trigonometric matrix. The relationship of this transformation to 2*2 trigonometric symplectic system and to three-term trigonometric recurrence relations is discussed as well.

Keywords

Three-term recurrence relation, symplectic difference system, trigonometric transformation, trigonometric system, Sturm-Liouville difference equation

Authors

DOŠLÝ, O.; PECHANCOVÁ, Š.

Released

26. 6. 2006

Publisher

Research India Publications

ISBN

0973-6069

Periodical

International Journal of Difference Equations

Year of study

2006

Number

1

State

Republic of India

Pages from

19

Pages to

29

Pages count

11

BibTex

@article{BUT44112,
  author="Ondřej {Došlý} and Šárka {Pechancová}",
  title="Trigonometric Recurrence Relations and Tridiagonal Trigonometric Matrices",
  journal="International Journal of Difference Equations",
  year="2006",
  volume="2006",
  number="1",
  pages="19--29",
  issn="0973-6069"
}