Your search keyword '"Mona Alsulami"' showing total 15 results

1. An Adomian decomposition method with some orthogonal polynomials to solve nonhomogeneous fractional differential equations (FDEs)

Author

Mariam Al-Mazmumy, Maryam Ahmed Alyami, Mona Alsulami, Asrar Saleh Alsulami, and Saleh S. Redhwan

Subjects

fractional differential equation, initial-value problem, adomian decomposition method, taylor series, legendre polynomials, chebyshev polynomials, Mathematics, QA1-939

Abstract

The present study introduced modifications to the standard Adomian decomposition method (ADM) by combining the Taylor series with orthogonal polynomials, such as Legendre polynomials and the first and second kinds of Chebyshev polynomials. These improvements can be applied to solve fractional differential equations with initial-value problems in the Caputo sense. The approaches are based on the use of orthogonal polynomials, which are essential components in approximation theories. The study carefully analyzed their respective absolute error differences, highlighting the computational benefits of the proposed modifications, which offer improved accuracy and require fewer computational steps. The effectiveness and accuracy of the approach were validated through numerical examples, confirming its efficiency and reliability.

Published

2024

2. New Grüss’s inequalities estimates considering the φ-fractional integrals

Author

Saleh S. Redhwan, Tariq A. Aljaaidi, Ali Hasan Ali, Maryam Ahmed Alyami, Mona Alsulami, and Najla Alghamdi

Subjects

Grüss inequalities, Fractional inequalities, φ-proportional fractional operators, Applied mathematics. Quantitative methods, T57-57.97

Abstract

Careful study of applied sciences and their development requires us to expand the scope of analytical studies. We aim during introducing the current manuscript to rediscover and present Grüss inequality in a new framework. In order to do that, we use the recently generalized proportional fractional integral operator for a certain function with respect to another continuous and strictly increasing function. Furthermore, we prove some new related inequalities using the current fractional integral operator. Some special cases of the presented results will be discussed.

Published

2024

3. Piecewise implicit coupled system under ABC fractional differential equations with variable order

Author

Saleh S. Redhwan, Maoan Han, Mohammed A. Almalahi, Maryam Ahmed Alyami, Mona Alsulami, and Najla Alghamdi

Subjects

abc-fractional differential equation, nonlocal conditions, fixed point theorem, Mathematics, QA1-939

Abstract

This research paper presented a novel investigation into an implicit coupled system of fractional variable order, which has not been previously studied in the existing literature. The study focused on establishing and developing sufficient conditions for the existence and uniqueness of solutions, as well as the Ulam-Hyers stability, for the proposed coupled system without using semigroup property. By extending the existing conclusions examined for the Atangana-Baleanu-Caputo (ABC) operator, we contributed to advancing the understanding of variable-order fractional differential equations. The paper provided a solid theoretical foundation for further analysis, numerical simulations, and practical applications. The obtained results have implications for designing and controlling systems modeled using fractional variable order equations and serve as a basis for addressing a wide range of dynamical problems. The transformation techniques, qualitative analysis, and illustrative examples presented in this work highlight its unique contributions and potential to serve as a foundation for future research.

Published

2024

4. A study on ODE-based model of risk breast cancer with body mass

Author

Sana Abdulkream Alharbi, Kaushik Dehingia, Awatif Jahman Alqarni, Mona Alsulami, AA Al Qarni, Anusmita Das, and Evren Hinçal

Subjects

mathematical modeling, breast cancer, estrogen, stability, numerical simulation, Mathematics, QA1-939, Engineering (General). Civil engineering (General), TA1-2040

Abstract

In this study, we propose a fat-estrogen-breast cancer mathematical model to discuss the effect of body mass, estrogen, and the immune system on the evolution of cancer cells. To do this, stability analysis has been performed at each of the biologically feasible equilibria of the model. It is found that the tumor-free equilibrium exists if the estrogen level is normal and is asymptotically stable if the growth of tumor cells in the presence of fat cells is less than the response rate of immune cells against the tumor; otherwise, it is unstable. However, the co-existing equilibrium exists for excess estrogen levels and it is stable, provided certain conditions hold. It is observed that the eradication or proliferation of tumor cells directly depends on the growth of fat cells, the response of the immune system against the tumor, and the estrogen level. Numerical simulations have been performed to verify the theoretical results.

Published

2023

5. Existence theory for a third-order ordinary differential equation with non-separated multi-point and nonlocal Stieltjes boundary conditions

Author

Mona Alsulami

Subjects

stieltjes boundary conditions, nonlocal, multi-point, existence, uniqueness, fixed point, bohnenblust-karlin, Mathematics, QA1-939

Abstract

This study develops the existence of solutions for a nonlinear third-order ordinary differential equation with non-separated multi-point and nonlocal Riemann-Stieltjes boundary conditions. Standard tools of fixed point theorems are applied to prove the existence and uniqueness of results for the problem at hand. Further, we made use of the fixed point theorem due to Bohnenblust-Karlin to discuss the existence of solutions for the multi-valued case. Lastly, we clarify the reported results by means of examples.

Published

2023

6. Boundary Value Problem for a Coupled System of Nonlinear Fractional q-Difference Equations with Caputo Fractional Derivatives

Author

Saleh S. Redhwan, Maoan Han, Mohammed A. Almalahi, Mona Alsulami, and Maryam Ahmed Alyami

Subjects

fractional q-integral, boundary conditions, Riemann–Liouville fractional q-derivative, fixed point theorems, Thermodynamics, QC310.15-319, Mathematics, QA1-939, Analysis, QA299.6-433

Abstract

This paper focuses on the analysis of a coupled system governed by a Caputo-fractional derivative with q-integral-coupled boundary conditions. This system is particularly relevant in modeling multi-atomic systems, including scenarios involving adsorbed atoms or clusters on crystalline surfaces, surface–atom scattering, and atomic friction. To investigate this system, we introduce an operator that exhibits fixed points corresponding to the solutions of the problem, effectively transforming the system into an equivalent fixed-point problem. We established the necessary conditions for the existence and uniqueness of solutions using the Leray–Schauder nonlinear alternative and the Banach contraction mapping principle, respectively. Stability results in the Ulam sense for the coupled system are also discussed, along with a sensitivity analysis of the range parameters. To support the validity of their findings, we provide illustrative examples. Overall, the paper offers a thorough examination and analysis of the considered coupled system, making important contributions to the understanding of multi-atomic systems and their mathematical modeling.

Published

2024

7. Existence theory for coupled nonlinear third-order ordinary differential equations with nonlocal multi-point anti-periodic type boundary conditions on an arbitrary domain

Author

Bashir Ahmad, Ahmed Alsaedi, Mona Alsulami, and Sotiris K. Ntouyas

Subjects

system of ordinary differential equations, Leray-Schauder, Banach, existence, fixed point, Mathematics, QA1-939

Abstract

In this paper, we derive existence and uniqueness results for a coupled system of nonlinear third order ordinary differential equations equipped with nonlocal multi-point anti-periodic type coupled boundary conditions. Leray-Schauder alternative and Banach contraction mapping principle are the main tools of our study. Examples are constructed for illustrating the obtained results. Under appropriate conditions, our results correspond to the ones for an ant-periodic boundary value problem of nonlinear third order ordinary differential equations.

Published

2019

8. Some new nonlinear second-order boundary value problems on an arbitrary domain

Author

Ahmed Alsaedi, Mona Alsulami, Ravi P. Agarwal, and Bashir Ahmad

Subjects

Ordinary differential equations, Integral, Multi-point boundary conditions, Existence, Ulam-stability, Mathematics, QA1-939

Abstract

Abstract In this paper, we develop the existence theory for nonlinear second-order ordinary differential equations equipped with new kinds of nonlocal non-separated type integral multi-point boundary conditions on an arbitrary domain. Existence results are proved with the aid of fixed point theorems due to Schaefer, Krasnoselskii, and Leray–Schauder, while the uniqueness of solutions for the given problem is established by means of contraction mapping principle. Examples are constructed for the illustration of the obtained results. Ulam-stability is also discussed for the given problem. A variant of the problem involving different boundary data is also discussed. Finally, we introduce an associated boundary value problem involving integro-differential equations and discuss the uniqueness of its solutions.

Published

2018

9. A Self-Adjoint Coupled System of Nonlinear Ordinary Differential Equations with Nonlocal Multi-Point Boundary Conditions on an Arbitrary Domain

Author

Hari Mohan Srivastava, Sotiris K. Ntouyas, Mona Alsulami, Ahmed Alsaedi, and Bashir Ahmad

Subjects

system of ordinary differential equations, nonlocal multi-point boundary conditions, sturm-liouville problems, existence results, uniqueness results, schauder fixed point theorem, Technology, Engineering (General). Civil engineering (General), TA1-2040, Biology (General), QH301-705.5, Physics, QC1-999, Chemistry, QD1-999

Abstract

The main object of this paper is to investigate the existence of solutions for a self-adjoint coupled system of nonlinear second-order ordinary differential equations equipped with nonlocal multi-point coupled boundary conditions on an arbitrary domain. We apply the Leray–Schauder alternative, the Schauder fixed point theorem and the Banach contraction mapping principle in order to derive the main results, which are then well-illustrated with the aid of several examples. Some potential directions for related further researches are also indicated.

Published

2021

10. Existence Theory for Nonlinear Third-Order Ordinary Differential Equations with Nonlocal Multi-Point and Multi-Strip Boundary Conditions

Author

Ahmed Alsaedi, Mona Alsulami, Hari M. Srivastava, Bashir Ahmad, and Sotiris K. Ntouyas

Subjects

nonlinear boundary value problem, nonlocal, multi-point, multi-strip, existence, Ulam stability, Mathematics, QA1-939

Abstract

We investigate the solvability and Ulam stability for a nonlocal nonlinear third-order integro-multi-point boundary value problem on an arbitrary domain. The nonlinearity in the third-order ordinary differential equation involves the unknown function together with its first- and second-order derivatives. Our main results rely on the modern tools of functional analysis and are well illustrated with the aid of examples. An analogue problem involving non-separated integro-multi-point boundary conditions is also discussed.

Published

2019

11. Existence theory for a third-order ordinary differential (equation, inclusion) with non-separated multi-point and nonlocal Stieltjes boundary conditions

Author

Mona Alsulami

Abstract

This research develop the existence of solutions for a nonlinear third order ordinary differential equation with non-separated multi-point and nonlocal Riemann-Stieltjes boundary conditions. Standard tools of fixed point theorems are applied to prove the existence and uniquness results for the problem at hand. We used fixed point theorem due to Bohnenblust-Karlin to discussed the existence of solutions for the multi-valued case. We derive some examples to clarify our results.

Published

2022

12. Existence theory for coupled nonlinear third-order ordinary differential equations with nonlocal multi-point anti-periodic type boundary conditions on an arbitrary domain

Author

Ahmed Alsaedi, Bashir Ahmad, Sotiris K. Ntouyas, and Mona Alsulami

Subjects

Banach, General Mathematics, lcsh:Mathematics, Mathematical analysis, Leray-Schauder, existence, Fixed point, lcsh:QA1-939, system of ordinary differential equations, Domain (mathematical analysis), Third order, Nonlinear system, fixed point, Ordinary differential equation, Contraction mapping, Uniqueness, Boundary value problem, Mathematics

Abstract

In this paper, we derive existence and uniqueness results for a coupled system of nonlinear third order ordinary differential equations equipped with nonlocal multi-point anti-periodic type coupled boundary conditions. Leray-Schauder alternative and Banach contraction mapping principle are the main tools of our study. Examples are constructed for illustrating the obtained results. Under appropriate conditions, our results correspond to the ones for an ant-periodic boundary value problem of nonlinear third order ordinary differential equations.

Published

2019

13. Second-order ordinary differential equations and inclusions with a new kind of integral and multi-strip boundary conditions

Author

Mona Alsulami, Bashir Ahmad, Ahmed Alsaedi, and Sotiris K. Ntouyas

Subjects

Ordinary differential equation, Organic Chemistry, Mathematical analysis, Order (group theory), Boundary value problem, Biochemistry, Mathematics

Published

2019

14. A Self-Adjoint Coupled System of Nonlinear Ordinary Differential Equations with Nonlocal Multi-Point Boundary Conditions on an Arbitrary Domain

Author

Sotiris K. Ntouyas, Ahmed Alsaedi, Bashir Ahmad, Hari M. Srivastava, and Mona Alsulami

Subjects

Technology, QH301-705.5, QC1-999, banach contraction mapping principle, existence results, 01 natural sciences, system of ordinary differential equations, Domain (mathematical analysis), Schauder fixed point theorem, nonlocal multi-point boundary conditions, General Materials Science, Contraction mapping, Boundary value problem, 0101 mathematics, Biology (General), schauder fixed point theorem, Instrumentation, QD1-999, Mathematics, Fluid Flow and Transfer Processes, Process Chemistry and Technology, Physics, 010102 general mathematics, Mathematical analysis, General Engineering, Order (ring theory), Engineering (General). Civil engineering (General), Computer Science Applications, 010101 applied mathematics, Nonlinear system, Chemistry, sturm-liouville problems, Ordinary differential equation, uniqueness results, TA1-2040, Self-adjoint operator, Leray–Schauder alternative

Abstract

The main object of this paper is to investigate the existence of solutions for a self-adjoint coupled system of nonlinear second-order ordinary differential equations equipped with nonlocal multi-point coupled boundary conditions on an arbitrary domain. We apply the Leray–Schauder alternative, the Schauder fixed point theorem and the Banach contraction mapping principle in order to derive the main results, which are then well-illustrated with the aid of several examples. Some potential directions for related further researches are also indicated.

Published

2021

15. Existence Theory for Nonlinear Third-Order Ordinary Differential Equations with Nonlocal Multi-Point and Multi-Strip Boundary Conditions

Author

Hari M. Srivastava, Ahmed Alsaedi, Sotiris K. Ntouyas, Mona Alsulami, and Bashir Ahmad

Subjects

Physics and Astronomy (miscellaneous), General Mathematics, multi-strip, 01 natural sciences, Stability (probability), Domain (mathematical analysis), Computer Science (miscellaneous), Applied mathematics, Boundary value problem, 0101 mathematics, nonlinear boundary value problem, Multi point, Mathematics, lcsh:Mathematics, nonlocal, 010102 general mathematics, existence, Ulam stability, Function (mathematics), lcsh:QA1-939, 010101 applied mathematics, Third order, Nonlinear system, Chemistry (miscellaneous), Ordinary differential equation, multi-point

Abstract

We investigate the solvability and Ulam stability for a nonlocal nonlinear third-order integro-multi-point boundary value problem on an arbitrary domain. The nonlinearity in the third-order ordinary differential equation involves the unknown function together with its first- and second-order derivatives. Our main results rely on the modern tools of functional analysis and are well illustrated with the aid of examples. An analogue problem involving non-separated integro-multi-point boundary conditions is also discussed.

Published

2019