The existence of solutions for some new boundary value problems involving the q-derivative operator in quasi-b-metric and b-metric-like spaces

Authors

Hojjat Afshari Department of Mathematics, Basic Science Faculty, University of Bonab, Bonab 08826, Iran Corresponding Author
Monireh Nosrati Sahlan Department of Mathematics, Basic Science Faculty, University of Bonab, Bonab 08826, Iran

Keywords:

\(q\)-fractional differential equations, \(\mathfrak{a}_{qs^p}\)-admissible mappings, quasi-\(b\)-metric and \(b\)-metric-like spaces

Abstract

By applying \(\mathfrak{a}\)-admissible and \(\mathfrak{a}_{qs^p}\)-admissible mappings, the existence of solutions of some new boundary value problems involving the \(q\)-derivative operator are investigated in quasi-\(b\)-metric and \(b\)-metric-like spaces.

References

[1] C. Derbazi, Z. Baitiche, M. Benchohra, Coupled system of ψ–Caputo fractional differential equations without and with delay in generalized Banach spaces, Results in Nonlinear Analysis, 2022, 5(1), 42 - 61,, doi.org/10.53006/rna.1007501.

[2] C. Derbazi, Z. Baitiche, A. Zada, Existence and uniqueness of positive solutions for fractional relaxation equation in terms of ψ-Caputo fractional derivative, International Journal of Nonlinear Sciences and Numerical Simulation, https://doi.org/10.1515/ijnsns-2020-0228.

[3] V. Roomi, H. Afshari, M. Nosrati, Existence and uniqueness for a fractional differential equation involving Atangana- Baleanu derivative by using a new contraction, Letters in Nonlinear Analysis and its Application, 1 (2) (2023), 52-56.

[4] P. Rajkovic, S. Marinkovic and M. Stankovic, Fractional integrals and derivatives in q-calculus, Appl. Anal. Discrete Math. 1, 311–323, 2007.

[5] V. Kac, P. Cheung, Quantum Calculus. Springer, New York, NY, USA, (2001).

[6] L. Zhang, S. Sun, Existence and uniqueness of solutions for mixed fractional q-difference boundary value problems, Bound. Value Probl. 2019, 2019:100, 15 pages.

[7] M.H. Annaby, Z.S. Mansour, q-Fractional Calculus and Equations; Springer: New York, NY, USA, 2012.

[8] M.H. Annaby, Z.S. Mansour, q-Taylor and interpolation series for Jackson q-difference operators. J. Math. Anal. Appl. 2008, 334, 472–483.

[9] R.P. Agarwal, Certain fractional q-integrals and q-derivatives. Proc. Camb. Phil. Soc. 1969, 66, 365–370.

[10] Ral, A.; Gupta, V.; Agarwal, R.P. Applications of q-Calculus in Operator Theory; Springer: New York, NY, USA, 2013.

[11] B. Samet, C. Vetro and P. Vetro, Fixed point theorems for α-ψ-contractive type mappings, Nonlinear Anal. 75 (2012) 2154-2165.

[12] K. Zoto, B.E. Rhoades and B.E. Radenovi, Some generalizations for (α − ψ, ϕ)-contractions in b-metric-like spaces and an application. Fixed Point Theory and Applications. (2015) 2015.

[13] A. Amini Harandi, Metric-like spaces, partial metric spaces and fixed points. Fixed Point Theory Appl. 2012, 204 (2012).

[14] Chakkrid Klin-eam, Cholatis Suanoom , Dislocated quasi-b-metric spaces and fixed point theorems for cyclic contractions. Fixed Point Theory Appl. 2015, 2015:74.DOI 10.1186/s13663-015-0325-2.

[15] N. Hussain, K. Vetro, F. Vetroc, Fixed point results for α-implicit contractions with application to integral equations, Nonlinear Analysis, Modelling and Control, Vol. 21(2016), No. 3, 362-378.

Authors

Keywords:

Abstract

References

Downloads

Published

Issue

Section

License

Make a Submission

Information