Research Article

Wronski Determinant of Trigonometric System

Volume: 5 Number: 1 March 1, 2022
Ufuk Kaya *
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Journal of Advanced Mathematics and Mathematics Education Cover Journal of Advanced Mathematics and Mathematics Education
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Wronski Determinant of Trigonometric System

Abstract

In this paper, we calculate the Wronskian of the trigonometric system \[ \cos{\lambda_{1}x},\sin{\lambda_{1}x},\cos{\lambda_{2}x},\sin{\lambda_{2}x},\dots,\cos{\lambda_{n}x},\sin{\lambda_{n}x} \] and prove that this system is linearly independent when $\lambda_{k}\ne 0$ and $\lambda_{k}^{2}\ne \lambda_{l}^{2}$ for $k\ne l$, where $\lambda_{1},\lambda_{2},\dots,\lambda_{n}\in\mathbb{C}$, $n\in\mathbb{N}$ are constants and $x$ is a complex variable. By using it, we evaluate the determinant below \[ \left| \begin{array}{ccccccc} 1&0&1&0&\cdots&1&0\\ 0&1&0&1&\cdots&0&1\\ \lambda_{1}&0&\lambda_{2}&0&\cdots&\lambda_{n}&0\\ 0&\lambda_{1}&0&\lambda_{2}&\cdots&0&\lambda_{n}\\ \lambda_{1}^{2}&0&\lambda_{2}^{2}&0&\cdots&\lambda_{n}^{2}&0\\ \vdots&\vdots&\vdots&\vdots&\ddots&\vdots&\vdots\\ 0&\lambda_{1}^{n-2}&0&\lambda_{2}^{n-2}&\cdots&0&\lambda_{n}^{n-2}\\ \lambda_{1}^{n-1}&0&\lambda_{2}^{n-1}&0&\cdots&\lambda_{n}^{n-1}&0\\ 0&\lambda_{1}^{n-1}&0&\lambda_{2}^{n-1}&\cdots&0&\lambda_{n}^{n-1} \end{array} \right|. \]

Keywords

Trigonometric system, Wronskian, determinant, linear independence, Abel

References

  1. Ahlfors V.L. 1979. Complex Analysis, McGraw-Hill Inc., New York.
  2. Boyce W.E., DiPrima R.C. 1986. Elementary differential equations and boundary value problems, Wiley, New York.
  3. Christensen O., Christensen K. 2006. Linear Independence and Series Expansions in Function Spaces, Am. Mat. Mon., 113 (7): 611-627.

Details

Primary Language

English

Subjects

Mathematical Sciences

Journal Section

Research Article

Authors

Publication Date

March 1, 2022

Submission Date

December 31, 2021

Acceptance Date

January 23, 2022

Published in Issue

Year 2022 Volume: 5 Number: 1

IZ

https://izlik.org/JA49SF43HA

Cite

RIS / Bibtex
APA
Kaya, U. (2022). Wronski Determinant of Trigonometric System. Journal of Advanced Mathematics and Mathematics Education, 5(1), 1-8. https://izlik.org/JA49SF43HA
AMA
1.Kaya U. Wronski Determinant of Trigonometric System. JAMAME. 2022;5(1):1-8. https://izlik.org/JA49SF43HA
Chicago
Kaya, Ufuk. 2022. “Wronski Determinant of Trigonometric System”. Journal of Advanced Mathematics and Mathematics Education 5 (1): 1-8. https://izlik.org/JA49SF43HA.
EndNote
Kaya U (March 1, 2022) Wronski Determinant of Trigonometric System. Journal of Advanced Mathematics and Mathematics Education 5 1 1–8.
IEEE
[1]U. Kaya, “Wronski Determinant of Trigonometric System”, JAMAME, vol. 5, no. 1, pp. 1–8, Mar. 2022, [Online]. Available: https://izlik.org/JA49SF43HA
ISNAD
Kaya, Ufuk. “Wronski Determinant of Trigonometric System”. Journal of Advanced Mathematics and Mathematics Education 5/1 (March 1, 2022): 1-8. https://izlik.org/JA49SF43HA.
JAMA
1.Kaya U. Wronski Determinant of Trigonometric System. JAMAME. 2022;5:1–8.
MLA
Kaya, Ufuk. “Wronski Determinant of Trigonometric System”. Journal of Advanced Mathematics and Mathematics Education, vol. 5, no. 1, Mar. 2022, pp. 1-8, https://izlik.org/JA49SF43HA.
Vancouver
1.Ufuk Kaya. Wronski Determinant of Trigonometric System. JAMAME [Internet]. 2022 Mar. 1;5(1):1-8. Available from: https://izlik.org/JA49SF43HA

Baş editör; Prof .Dr. Seyfullah Hızarcı