Falling Body Motion in Time Scale Calculus

Neslihan Nesliye Pelen; Zeynep Kayar

doi:10.54287/gujsa.1427944

EN

Falling Body Motion in Time Scale Calculus

Abstract

The falling body problem for different time scales, such as ℝ, ℤ, hℤ, qℕ0, ℙc,d is the subject of this study. To deal with this problem, we use time-scale calculus. Time scale dynamic equations are used to define the falling body problem. The exponential time scale function is used for the solutions of these problems. The solutions of the falling body problem in each of these time scales are found. Moreover, we also test our mathematical results with numerical simulations.

Keywords

References

Akın, E. & Bohner, M. (2003). Miscellaneous Dynamic Equations. Methods and Applications of Analysis, 10(1), pp.11-30. https://dx.doi.org/10.4310/MAA.2003.v10.n1.a2
Akın, E., Pelen, N. N., Tiryaki I. U., & Yalcin, F. (2020). Parameter identification for gompertz and logistic dynamic equations. Plos One, 15(4): e0230582. https://doi.org/10.1371/journal.pone.0230582
Alanazi, A. M., Ebaid, A., Alhawiti W. M., & Muhiuddin, G. (2020). The Falling Body Problem in Quantum Calculus. Front. Phys., 8, 43. https://doi.org/10.3389/fphy.2020.00043
Anderson, D. R. (2005). Time-scale integral inequalities. J. Inequal. Pure Appl. Math., 6(3), 66.
Bohner, M., & Peterson, A. (2001). Dynamic Equations on Time Scale: An Introduction with Applications. Birkhauser, Boston, Inc., Boston, MA. https://doi.org/10.1007/978-1-4612-0201-1
Elaydi, S. (2005). An Introduction to Difference Equations. Springer SBM. https://doi.org/10.1007/0-387-27602-5
Hilger, S. (1988). Ein Maßkettenkalk ̈ul mit Anwendung auf Zentrumsmannigfaltigkeiten. PhD Thesis. Universitat Würzburg
Jackson, F. H. (1910). On a q-definite integrals. The Quarterly Journal of Pure and Applied Mathematics, 41, 193-203.

Details

Primary Language

English

Subjects

Dynamical Systems in Applications

Journal Section

Research Article

Authors

Neslihan Nesliye Pelen ^*
0000-0003-1853-3959
Türkiye

Zeynep Kayar
0000-0002-8309-7930
Türkiye

Early Pub Date

March 21, 2024

Publication Date

March 28, 2024

Submission Date

January 29, 2024

Acceptance Date

March 8, 2024

Published in Issue

Year 2024 Volume: 11 Number: 1

DOI

https://doi.org/10.54287/gujsa.1427944

IZ

https://izlik.org/JA66DD23WR

Cite

RIS / Bibtex

APA

Pelen, N. N., & Kayar, Z. (2024). Falling Body Motion in Time Scale Calculus. Gazi University Journal of Science Part A: Engineering and Innovation, 11(1), 210-224. https://doi.org/10.54287/gujsa.1427944

AMA

1.Pelen NN, Kayar Z. Falling Body Motion in Time Scale Calculus. GU J Sci, Part A. 2024;11(1):210-224. doi:10.54287/gujsa.1427944

Chicago

Pelen, Neslihan Nesliye, and Zeynep Kayar. 2024. “Falling Body Motion in Time Scale Calculus”. Gazi University Journal of Science Part A: Engineering and Innovation 11 (1): 210-24. https://doi.org/10.54287/gujsa.1427944.

EndNote

Pelen NN, Kayar Z (March 1, 2024) Falling Body Motion in Time Scale Calculus. Gazi University Journal of Science Part A: Engineering and Innovation 11 1 210–224.

IEEE

[1]N. N. Pelen and Z. Kayar, “Falling Body Motion in Time Scale Calculus”, GU J Sci, Part A, vol. 11, no. 1, pp. 210–224, Mar. 2024, doi: 10.54287/gujsa.1427944.

ISNAD

Pelen, Neslihan Nesliye - Kayar, Zeynep. “Falling Body Motion in Time Scale Calculus”. Gazi University Journal of Science Part A: Engineering and Innovation 11/1 (March 1, 2024): 210-224. https://doi.org/10.54287/gujsa.1427944.

JAMA

1.Pelen NN, Kayar Z. Falling Body Motion in Time Scale Calculus. GU J Sci, Part A. 2024;11:210–224.

MLA

Pelen, Neslihan Nesliye, and Zeynep Kayar. “Falling Body Motion in Time Scale Calculus”. Gazi University Journal of Science Part A: Engineering and Innovation, vol. 11, no. 1, Mar. 2024, pp. 210-24, doi:10.54287/gujsa.1427944.

Vancouver

1.Neslihan Nesliye Pelen, Zeynep Kayar. Falling Body Motion in Time Scale Calculus. GU J Sci, Part A. 2024 Mar. 1;11(1):210-24. doi:10.54287/gujsa.1427944