${q}_{k}-$Laplace Transform on Quantum Integral

Mehmet Çağrı Yılmazer; Sertaç Göktaş; Emrah Yılmaz; Mikail Et

doi:10.47000/tjmcs.1343335

Research Article

${q}_{k}-$Laplace Transform on Quantum Integral

Year 2024, Volume: 16 Issue: 1, 103 - 118, 30.06.2024

Mehmet Çağrı Yılmazer , Sertaç Göktaş , Emrah Yılmaz , Mikail Et

https://doi.org/10.47000/tjmcs.1343335

Abstract

In this study, we present $q_{k}-$Laplace transform by $q_{k}-$integral on quantum analogue. We give some properties of $q_{k}-$Laplace transform. The $q_{k}-$Laplace transforms of some common functions are calculated.

Keywords

Laplace transformation , $q-$calculus , ${q}_{k}-$calculus

References

Abdi, W.H., Certain inversion and representation formulae for q−Laplace transforms, Mathematische Zeitschrift, 83(1964), 238–249.
Abdulazeez, S.T., Modanli, M. Analytic solution of fractional order Pseudo-Hyperbolic Telegraph equation using modified double Laplace transform method, International Journal of Mathematics and Computer in Engineering, 1(2023), 105–114.
Adams, C.R., On the linear ordinary q−difference equation, Annals of mathematics, (1928), 195–205.
Ahmad, B., Boundary-value problems for nonlinear third-order q−difference equations, Electronic Journal of Differential Equations, 94(2011), 1–7.
Ahmad, B., Alsaedi, A., Ntouyas, S.K., A study of second-order q−difference equations with boundary conditions, Advances in difference equations, 35(2012), 1–10.
Ahmad, B., Alsaedi, A., Ntouyas, S.K., Tariboon, J., Alzahrani, F., Nonlocal boundary value problems for impulsive fractional qk-difference equations, Advances in Difference Equations, 124(2016), 1–16.
Ahmad, B., Ntouyas, S.K., Tariboon, J., Quantum Calculus: New Concepts, Impulsive IVPs and BVPs, Inequalities, New York, World Scientific, 2016.
Alp, N., Sarıkaya, M.Z., q−Laplace transform on quantum integral, Kragujevac Journal of Mathematics, 47(2023) 153–164.
Alp, N., Sarıkaya, M. Z., A new definition and properties of quantum integral which calls q−integral, Konuralp Journal of Mathematics, 5(2017), 146–159.
Bangerezako, G., Variational q−calculus, Journal of Mathematical Analysis and Applications, 289(2004), 650–665.
Bohner, M., Guseinov, G.Sh., The h−Laplace and q−Laplace transforms, Journal of Mathematical Analysis and Applications, 365(2010), 75–92.
Bohner, M, Hudson, T., Euler-type boundary value problems in quantum calculus, International Journal of Applied Mathematics and Statistics, 9(2007), 19–23.
Bohner, M, Peterson, A, Dynamic Equations on Time Scales: An Introduction with Applications. Birkh¨auser, Boston, 2001.
Carmichael, R.D., The general theory of linear q−difference equations, American journal of mathematics, 34(1912), 147–168.
Cieslinski, J.L., Improved q−exponential and q−trigonometric functions, Applied Mathematics Letters, 24(2011), 2110–2114.
Chung, W. S., Kim, T., Kwon, H.I., On the q−analog of the Laplace transform, Russian Journal of Mathematical Physics, 21(2014), 156–168.
Dennis, G.Z., Advanced Engineering Mathematics, Jones & Bartlett Publishers, 2020.
Diaz, R., Teruel, C., qk-Generalized Gamma and Beta Functions, Journal of Nonlinear Mathematical Physics, 12(2005), 118–134.
Jackson, F., q−Form of Taylor’s theorem, Messenger of Mathematics, 39(1909), 62–64.
Jackson, F.H., On q−definite integrals, Quarterly Journal of Pure and Applied Mathematics, 41(1910), 193–203.
Kac, V., Cheung, P., Quantum Calculus, New York, Springer, 2002.
Rajkovic, P.M., Stankovic, M.S., Marinkovic, S. D. The zeros of polynomials orthogonal with respect to q-integral on several intervals in the complex plane, In Proceedings of The Fifth International Conference on Geometry, Integrability and Quantization Vol. 5(2004), 178–189.
Sudsutad, W., Ntouyas, S.K., Tariboon, J., Quantum integral inequalities for convex functions, Journal of Mathematical Inequalities, 9(2015), 781–793.
Tariboon, J., Ntouyas, S.K., Quantum calculus on finite intervals and applications to impulsive difference equations, Advances in Difference Equations, 282(2013), 1–19.
Tariboon, J.i Ntouyas, S.K., Quantum integral inequalities on finite intervals, Journal of Inequalities and Applications, 121(2014).
Trjitzinsky, W.J., Analytic theory of linear q− difference equations, Acta mathematica, 61(1933), 1–38.
Uçar, F., Albayrak, D., On q−Laplace type integral operators and their applications, Journal of Difference Equations and Applications, 18(2012), 1001–1014.
Yilmaz, E., Goktas, S., On the solution of a Sturm-Liouville problem by using Laplace transform on time scales, Cumhuriyet Science Journal, 42(2021), 132–140.
Yu, C, Wang, J., Existence of solutions for nonlinear second-order q−difference equations with first-order q−derivatives, Advances in Difference Equations, 124(2013), 1–11.

Year 2024, Volume: 16 Issue: 1, 103 - 118, 30.06.2024

Mehmet Çağrı Yılmazer , Sertaç Göktaş , Emrah Yılmaz , Mikail Et

https://doi.org/10.47000/tjmcs.1343335

Abstract

References

Abdi, W.H., Certain inversion and representation formulae for q−Laplace transforms, Mathematische Zeitschrift, 83(1964), 238–249.
Abdulazeez, S.T., Modanli, M. Analytic solution of fractional order Pseudo-Hyperbolic Telegraph equation using modified double Laplace transform method, International Journal of Mathematics and Computer in Engineering, 1(2023), 105–114.
Adams, C.R., On the linear ordinary q−difference equation, Annals of mathematics, (1928), 195–205.
Ahmad, B., Boundary-value problems for nonlinear third-order q−difference equations, Electronic Journal of Differential Equations, 94(2011), 1–7.
Ahmad, B., Alsaedi, A., Ntouyas, S.K., A study of second-order q−difference equations with boundary conditions, Advances in difference equations, 35(2012), 1–10.
Ahmad, B., Alsaedi, A., Ntouyas, S.K., Tariboon, J., Alzahrani, F., Nonlocal boundary value problems for impulsive fractional qk-difference equations, Advances in Difference Equations, 124(2016), 1–16.
Ahmad, B., Ntouyas, S.K., Tariboon, J., Quantum Calculus: New Concepts, Impulsive IVPs and BVPs, Inequalities, New York, World Scientific, 2016.
Alp, N., Sarıkaya, M.Z., q−Laplace transform on quantum integral, Kragujevac Journal of Mathematics, 47(2023) 153–164.
Alp, N., Sarıkaya, M. Z., A new definition and properties of quantum integral which calls q−integral, Konuralp Journal of Mathematics, 5(2017), 146–159.
Bangerezako, G., Variational q−calculus, Journal of Mathematical Analysis and Applications, 289(2004), 650–665.
Bohner, M., Guseinov, G.Sh., The h−Laplace and q−Laplace transforms, Journal of Mathematical Analysis and Applications, 365(2010), 75–92.
Bohner, M, Hudson, T., Euler-type boundary value problems in quantum calculus, International Journal of Applied Mathematics and Statistics, 9(2007), 19–23.
Bohner, M, Peterson, A, Dynamic Equations on Time Scales: An Introduction with Applications. Birkh¨auser, Boston, 2001.
Carmichael, R.D., The general theory of linear q−difference equations, American journal of mathematics, 34(1912), 147–168.
Cieslinski, J.L., Improved q−exponential and q−trigonometric functions, Applied Mathematics Letters, 24(2011), 2110–2114.
Chung, W. S., Kim, T., Kwon, H.I., On the q−analog of the Laplace transform, Russian Journal of Mathematical Physics, 21(2014), 156–168.
Dennis, G.Z., Advanced Engineering Mathematics, Jones & Bartlett Publishers, 2020.
Diaz, R., Teruel, C., qk-Generalized Gamma and Beta Functions, Journal of Nonlinear Mathematical Physics, 12(2005), 118–134.
Jackson, F., q−Form of Taylor’s theorem, Messenger of Mathematics, 39(1909), 62–64.
Jackson, F.H., On q−definite integrals, Quarterly Journal of Pure and Applied Mathematics, 41(1910), 193–203.
Kac, V., Cheung, P., Quantum Calculus, New York, Springer, 2002.
Rajkovic, P.M., Stankovic, M.S., Marinkovic, S. D. The zeros of polynomials orthogonal with respect to q-integral on several intervals in the complex plane, In Proceedings of The Fifth International Conference on Geometry, Integrability and Quantization Vol. 5(2004), 178–189.
Sudsutad, W., Ntouyas, S.K., Tariboon, J., Quantum integral inequalities for convex functions, Journal of Mathematical Inequalities, 9(2015), 781–793.
Tariboon, J., Ntouyas, S.K., Quantum calculus on finite intervals and applications to impulsive difference equations, Advances in Difference Equations, 282(2013), 1–19.
Tariboon, J.i Ntouyas, S.K., Quantum integral inequalities on finite intervals, Journal of Inequalities and Applications, 121(2014).
Trjitzinsky, W.J., Analytic theory of linear q− difference equations, Acta mathematica, 61(1933), 1–38.
Uçar, F., Albayrak, D., On q−Laplace type integral operators and their applications, Journal of Difference Equations and Applications, 18(2012), 1001–1014.
Yilmaz, E., Goktas, S., On the solution of a Sturm-Liouville problem by using Laplace transform on time scales, Cumhuriyet Science Journal, 42(2021), 132–140.
Yu, C, Wang, J., Existence of solutions for nonlinear second-order q−difference equations with first-order q−derivatives, Advances in Difference Equations, 124(2013), 1–11.

There are 29 citations in total.

Details

Primary Language	English
Subjects	Symbolic Calculation, Dynamical Systems in Applications
Journal Section	Research Article
Authors	Mehmet Çağrı Yılmazer 0000-0001-9784-838X Sertaç Göktaş 0000-0001-7842-6309 Emrah Yılmaz 0000-0002-7822-9193 Mikail Et 0000-0001-8292-7819
Publication Date	June 30, 2024
Published in Issue	Year 2024 Volume: 16 Issue: 1

Cite

APA	Yılmazer, M. Ç., Göktaş, S., Yılmaz, E., & Et, M. (2024). ${q}_{k}-$Laplace Transform on Quantum Integral. Turkish Journal of Mathematics and Computer Science, 16(1), 103-118. https://doi.org/10.47000/tjmcs.1343335
AMA	1.Yılmazer MÇ, Göktaş S, Yılmaz E, Et M. ${q}_{k}-$Laplace Transform on Quantum Integral. TJMCS. 2024;16(1):103-118. doi:10.47000/tjmcs.1343335
Chicago	Yılmazer, Mehmet Çağrı, Sertaç Göktaş, Emrah Yılmaz, and Mikail Et. 2024. “${q}_{k}-$Laplace Transform on Quantum Integral”. Turkish Journal of Mathematics and Computer Science 16 (1): 103-18. https://doi.org/10.47000/tjmcs.1343335.
EndNote	Yılmazer MÇ, Göktaş S, Yılmaz E, Et M (June 1, 2024) ${q}_{k}-$Laplace Transform on Quantum Integral. Turkish Journal of Mathematics and Computer Science 16 1 103–118.
IEEE	[1]M. Ç. Yılmazer, S. Göktaş, E. Yılmaz, and M. Et, “${q}_{k}-$Laplace Transform on Quantum Integral”, TJMCS, vol. 16, no. 1, pp. 103–118, June 2024, doi: 10.47000/tjmcs.1343335.
ISNAD	Yılmazer, Mehmet Çağrı - Göktaş, Sertaç - Yılmaz, Emrah - Et, Mikail. “${q}_{k}-$Laplace Transform on Quantum Integral”. Turkish Journal of Mathematics and Computer Science 16/1 (June 1, 2024): 103-118. https://doi.org/10.47000/tjmcs.1343335.
JAMA	1.Yılmazer MÇ, Göktaş S, Yılmaz E, Et M. ${q}_{k}-$Laplace Transform on Quantum Integral. TJMCS. 2024;16:103–118.
MLA	Yılmazer, Mehmet Çağrı, et al. “${q}_{k}-$Laplace Transform on Quantum Integral”. Turkish Journal of Mathematics and Computer Science, vol. 16, no. 1, June 2024, pp. 103-18, doi:10.47000/tjmcs.1343335.
Vancouver	1.Yılmazer MÇ, Göktaş S, Yılmaz E, Et M. ${q}_{k}-$Laplace Transform on Quantum Integral. TJMCS [Internet]. 2024 June 1;16(1):103-18. Available from: https://izlik.org/JA37FK37NR

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