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Year 2019, Volume: 1 Issue: 3, 156 - 164, 31.12.2019
https://doi.org/10.46740/alku.662587

Abstract

References

  • [1] D.J.Jones, “Use of a shooting method to compute eigenvalues of fourth- order two-point boundary value problems” ,Journal of Computational and Applied Mathematics, Volume 47, No. 3, PP. 395-400
  • [2] X.Chen, “The Shooting Method for Solving Eigenvalue Problems”, Journal of Mathemtical Analysis and applications 203, 435]450 1996.
  • [3] S.Li, Y.H.Zhou & X.Zheng (2002), “Thermal Postbuckling of a Heated Elastic Rod with Pinned-Fixed Ends”, Journal of Thermal Stresses, 25:1, 45-56,
  • [4] S.-R. Li, “Vibration of Thermally Post-Buckled Orthotropic Circular Plates”, Journal of Sound and vibration (2001) ,248(2), 379}386
  • [5] Y.ZHU, Y.J.Hu, C.J.Cheng, “Analysis of nonlinear stability and post-buckling for Euler-type beam-column Structure”, Appl. Math. Mech. -Engl. Ed., 32(6), 719–728 (2011)
  • [6] Q.Li, “Shooting method for free vibration of FGM Reissner-Mindlin circular platesresting on elastic foundation in thermal environments”, Journal of Vibroengineering 19(6) • October 2017
  • [7] L.S.Ma, Buckling of Functionally Graded Circular/Annular Plates Based on the First-Order Shear Deformation Plate Theory, Key Engineering Materials 261-263:609-614 • January 2004
  • [8] R.P.Agarwal, “On the method of complementary functions for nonlinear boundary-value problems”, Journal of Optimization Theory and Applications volume 36, pages139–144(1982)
  • [9] A.Miele, “Method of particular solutions for linear, two-point boundary-value problems”, Journal of Optimization Theory and Applications, July 1968, Volume 2, Issue 4, pp 260–273
  • [10] K.N.Murty, K.R.Prasad, Y.S.Rao, “On the Method of Complementary Functions for Linear and Nonlinear Two-Point Boundary Value Problems”, Journal of Mathematical Analysis & Applications, 167, 32-42 (1992)
  • [11] S.Yildirim,N.Tutuncu, “Effect of Magneto-Thermal Loads on the Rotational Instability of Heterogeneous Rotors”, AIAA Journal, March 2019
  • [12] S.Yildirim,N.Tutuncu, “On the Inertio-Elastic Instability of Variable-Thickness Functionally-Graded Disks”, Mechanics Research Communications, 91:1-6, May 2018

Numerical Methods in Calculating Eigenvalues: Case Studies in Stability of Euler Columns

Year 2019, Volume: 1 Issue: 3, 156 - 164, 31.12.2019
https://doi.org/10.46740/alku.662587

Abstract

A comparative analysis of well renowned “Shooting Method” with another numerical method “Complementary Functions Method” (CFM) is presented for calculating eigenvalue (λ). Contrary to the shooting method hit and trial approach, CFM exploits the properties of linear ordinary differential equation (LODE). In the case of linear eigenvalue Boundary value Problem (BVP), CFM generates an algebraic equation system with one unknown “λ” and, alone root finding method is sufficient to give required eigenvalue. However, the Shooting Method create a system of algebraic equations containing two unknowns “λ” and “missing initial conditions”, that demands an additional numerical technique along with root finding method. These radical differences between two approaches, sets the basis for this comparative investigation. As a case study in Linear Elastic Stability, different cases of Euler columns are investigated by finding eigenvalues for each case numerically, under both methods. Comparison is performed on the basis of results accuracy and cost effectiveness for both numerical techniques while solving linear stability problems.

References

  • [1] D.J.Jones, “Use of a shooting method to compute eigenvalues of fourth- order two-point boundary value problems” ,Journal of Computational and Applied Mathematics, Volume 47, No. 3, PP. 395-400
  • [2] X.Chen, “The Shooting Method for Solving Eigenvalue Problems”, Journal of Mathemtical Analysis and applications 203, 435]450 1996.
  • [3] S.Li, Y.H.Zhou & X.Zheng (2002), “Thermal Postbuckling of a Heated Elastic Rod with Pinned-Fixed Ends”, Journal of Thermal Stresses, 25:1, 45-56,
  • [4] S.-R. Li, “Vibration of Thermally Post-Buckled Orthotropic Circular Plates”, Journal of Sound and vibration (2001) ,248(2), 379}386
  • [5] Y.ZHU, Y.J.Hu, C.J.Cheng, “Analysis of nonlinear stability and post-buckling for Euler-type beam-column Structure”, Appl. Math. Mech. -Engl. Ed., 32(6), 719–728 (2011)
  • [6] Q.Li, “Shooting method for free vibration of FGM Reissner-Mindlin circular platesresting on elastic foundation in thermal environments”, Journal of Vibroengineering 19(6) • October 2017
  • [7] L.S.Ma, Buckling of Functionally Graded Circular/Annular Plates Based on the First-Order Shear Deformation Plate Theory, Key Engineering Materials 261-263:609-614 • January 2004
  • [8] R.P.Agarwal, “On the method of complementary functions for nonlinear boundary-value problems”, Journal of Optimization Theory and Applications volume 36, pages139–144(1982)
  • [9] A.Miele, “Method of particular solutions for linear, two-point boundary-value problems”, Journal of Optimization Theory and Applications, July 1968, Volume 2, Issue 4, pp 260–273
  • [10] K.N.Murty, K.R.Prasad, Y.S.Rao, “On the Method of Complementary Functions for Linear and Nonlinear Two-Point Boundary Value Problems”, Journal of Mathematical Analysis & Applications, 167, 32-42 (1992)
  • [11] S.Yildirim,N.Tutuncu, “Effect of Magneto-Thermal Loads on the Rotational Instability of Heterogeneous Rotors”, AIAA Journal, March 2019
  • [12] S.Yildirim,N.Tutuncu, “On the Inertio-Elastic Instability of Variable-Thickness Functionally-Graded Disks”, Mechanics Research Communications, 91:1-6, May 2018
There are 12 citations in total.

Details

Primary Language English
Subjects Engineering
Journal Section Makaleler
Authors

Hammad Jamil

Naki Tütüncü

Publication Date December 31, 2019
Submission Date December 20, 2019
Acceptance Date January 7, 2020
Published in Issue Year 2019 Volume: 1 Issue: 3

Cite

APA Jamil, H., & Tütüncü, N. (2019). Numerical Methods in Calculating Eigenvalues: Case Studies in Stability of Euler Columns. ALKÜ Fen Bilimleri Dergisi, 1(3), 156-164. https://doi.org/10.46740/alku.662587
AMA Jamil H, Tütüncü N. Numerical Methods in Calculating Eigenvalues: Case Studies in Stability of Euler Columns. ALKÜ Fen Bilimleri Dergisi. December 2019;1(3):156-164. doi:10.46740/alku.662587
Chicago Jamil, Hammad, and Naki Tütüncü. “Numerical Methods in Calculating Eigenvalues: Case Studies in Stability of Euler Columns”. ALKÜ Fen Bilimleri Dergisi 1, no. 3 (December 2019): 156-64. https://doi.org/10.46740/alku.662587.
EndNote Jamil H, Tütüncü N (December 1, 2019) Numerical Methods in Calculating Eigenvalues: Case Studies in Stability of Euler Columns. ALKÜ Fen Bilimleri Dergisi 1 3 156–164.
IEEE H. Jamil and N. Tütüncü, “Numerical Methods in Calculating Eigenvalues: Case Studies in Stability of Euler Columns”, ALKÜ Fen Bilimleri Dergisi, vol. 1, no. 3, pp. 156–164, 2019, doi: 10.46740/alku.662587.
ISNAD Jamil, Hammad - Tütüncü, Naki. “Numerical Methods in Calculating Eigenvalues: Case Studies in Stability of Euler Columns”. ALKÜ Fen Bilimleri Dergisi 1/3 (December 2019), 156-164. https://doi.org/10.46740/alku.662587.
JAMA Jamil H, Tütüncü N. Numerical Methods in Calculating Eigenvalues: Case Studies in Stability of Euler Columns. ALKÜ Fen Bilimleri Dergisi. 2019;1:156–164.
MLA Jamil, Hammad and Naki Tütüncü. “Numerical Methods in Calculating Eigenvalues: Case Studies in Stability of Euler Columns”. ALKÜ Fen Bilimleri Dergisi, vol. 1, no. 3, 2019, pp. 156-64, doi:10.46740/alku.662587.
Vancouver Jamil H, Tütüncü N. Numerical Methods in Calculating Eigenvalues: Case Studies in Stability of Euler Columns. ALKÜ Fen Bilimleri Dergisi. 2019;1(3):156-64.