Your search keyword '"Askar, Sameh S."' showing total 22 results

1. A non‐local fractional two‐phase delay thermoelastic model for a solid half‐space whose properties change with temperature and affected by hydrostatic pressure.

Author

Abouelregal, Ahmed E., Marin, Marin, Askar, Sameh S., and Foul, Abdelaziz

Abstract

This article discusses changes in heat transfer resulting from laser pulses and magnetic fields produced in thermoelastic materials under initial stress. This paper introduces a novel approach to modeling generalized thermoelastic materials by including fractional time derivatives with Eringen's non‐local thermoelastic theory. This model incorporates both the Caputo–Fabrizio and the Atangana–Baleanu derivatives, which are novel forms of fractional derivatives in the domain of fractional calculus. Analytical formulations for system variables, such as temperature and thermal stress, were derived using the Laplace transform method. This was done considering the effects of laser pulses, non‐local actuators, and fractional actuators. The findings of these investigations are showcased through numerical illustrations and visual representations. The research also included comparisons between the acquired results and those derived from earlier theories, which may be regarded as a specific instance. Validating the suggested model and showing its correctness and applicability is seen as a crucial step. [ABSTRACT FROM AUTHOR]

Published

2024

2. A modified mathematical model for thermo-viscous thermal conduction incorporating memory-based derivatives and the Moore–Gibson–Thomson equation.

Author

Abouelregal, Ahmed E., Marin, Marin, Askar, Sameh S., and Foul, Abdelaziz

Subjects

*LASER beams, *STRAINS & stresses (Mechanics), *VISCOELASTIC materials, *HEAT radiation & absorption, *MATHEMATICAL models, *HEAT equation, *ASTROPHYSICAL radiation

Abstract

Analyzing the viscoelastic characteristics of materials, especially polymers, is essential for understanding their mechanical properties and their capacity to function in different conditions. This paper presents a novel viscoelastic heat transfer model that integrates a memory-based derivative with the Moore–Gibson–Thomson (MGT) equation. The purpose is to examine the viscoelastic characteristics of materials and assess their response to external stresses and deformations over a certain period of time. In addition to incorporating the third-type thermoelastic model that Green and Naghdi provided, the derivation of this thermo-viscoelastic model included the integration of heat flow and its time derivative into Fourier's equation. To verify and understand the proposed model, it was applied to consider an unbounded viscoelastic semi-space immersed in a uniform magnetic field and exposed to non-Gaussian laser radiation as a heat source. An analysis of computational results was conducted to evaluate how the behavior of the field variables under consideration is affected by viscoelastic coefficients and memory-based derived factors. [ABSTRACT FROM AUTHOR]

Published

2024

3. Delay Differential Equations with Several Sublinear Neutral Terms: Investigation of Oscillatory Behavior.

Author

Muhsin, Waed, Moaaz, Osama, Askar, Sameh S., Alshamrani, Ahmad M., and Elabbasy, Elmetwally M.

Subjects

*DIFFERENTIAL equations, *DELAY differential equations, *FUNCTIONAL differential equations

Abstract

In this work, new oscillation criteria are established for a second-order differential equation with several sublinear neutral terms and in the canonical case. To determine the oscillation conditions, we followed the Riccati approach and also compared the studied equation with a first-order delay equation. Obtaining the oscillation conditions required deducing some new relationships linking the solution to the corresponding function as well as its derivatives. The paper addresses some interesting analytical points in the study of the oscillation of equations with several sublinear neutral terms. These new findings complement some well-known findings in the literature. Furthermore, an example is provided to show the importance of the results. [ABSTRACT FROM AUTHOR]

Published

2023

4. More Effective Conditions for Testing the Oscillatory Behavior of Solutions to a Class of Fourth-Order Functional Differential Equations.

Author

Alrashdi, Hail S., Moaaz, Osama, Askar, Sameh S., Alshamrani, Ahmad M., and Elabbasy, Elmetwally M.

Subjects

*FUNCTIONAL differential equations, *DIFFERENTIAL equations, *COMPARATIVE method

Abstract

This paper presents an investigation into the qualitative behavior of solutions for a specific class of fourth-order half-linear neutral differential equations. The main objective of this study is to improve the relationship between the solution and its corresponding function. By developing improved relationships, a novel criterion is proposed to determine the oscillatory behavior of the studied equation. The exclusion of positive solutions is achieved through a comparative approach in which the examined equation is compared to second-order equations. Additionally, the significance of the obtained results is demonstrated by applying them to various illustrative examples. [ABSTRACT FROM AUTHOR]

Published

2023

5. Cryptographic algorithm based on pixel shuffling and dynamical chaotic economic map.

Author

Askar, Sameh S., Karawia, Abdelrahman A., and Alammar, Fatmah S.

Abstract

In the literature, different types of algorithms that are organised to encrypt and decrypt images have been introduced. Some of these depend on chaotic systems where bifurcation routes to chaos exist. Those algorithms have advantages and disadvantages so far as their security level and computational speed are concerned. This study proposes a robust algorithm based on a pixel shuffling and a one‐dimensional chaotic economic map for encrypting and decrypting images. The proposed algorithm is implemented on many images. The security and performance of the proposed method are analysed thoroughly by using key space, key‐sensitivity, correlation of two adjacent pixels, information entropy, contrast and differential attack. On the basis of the obtained experimental results, the proposed algorithm is characterised by a large size of key space, a high sensitivity to the secret key, very low correlation coefficients, a good information entropy and a high contrast. Finally, the experiments are confirmed that the proposed algorithm can resist statistical and differential attacks with high efficiency. [ABSTRACT FROM AUTHOR]

Published

2018

6. Fourth-Order Neutral Differential Equation: A Modified Approach to Optimizing Monotonic Properties.

Author

Nabih, Amany, Moaaz, Osama, Askar, Sameh S., Alshamrani, Ahmad M., and Elabbasy, Elmetwally M.

Subjects

*DIFFERENTIAL equations, *FUNCTIONAL differential equations

Abstract

In this article, we investigate some qualitative properties of solutions to a class of functional differential equations with multi-delay. Using a modified approach, we first derive a number of optimized relations and inequalities that relate the solution x s to its corresponding function z s and its derivatives. After classifying the positive solutions, we follow the Riccati approach and principle of comparison, where fourth-order differential equations are compared with first-order differential equations to obtain conditions that exclude the positive solutions. Then, we introduce new oscillation conditions. With regard to previous relevant results, our results are an extension and complement to them. This work has theoretical significance in that it uncovers some new relationships that aid in developing the oscillation theory of higher-order equations in addition to the applied relevance of neutral differential equations. [ABSTRACT FROM AUTHOR]

Published

2023

7. Optimizing the Monotonic Properties of Fourth-Order Neutral Differential Equations and Their Applications.

Author

Salah, Hend, Moaaz, Osama, Askar, Sameh S., Alshamrani, Ahmad M., and Elabbasy, Elmetwally M.

Subjects

*DIFFERENTIAL equations, *FUNCTIONAL differential equations, *DELAY differential equations, *AEROSPACE engineering

Abstract

We investigate the oscillation of the fourth-order differential equation for a class of functional differential equations of the neutral type. We obtain a new single-oscillation criterion for the oscillation of all the solutions of our equation. We establish new monotonic properties for some cases of positive solutions of the studied equation. Moreover, we improve these properties by using an iterative method. This development of monotonic properties contributes to obtaining new and more efficient criteria for verifying the oscillation of the equation. The results obtained extend and improve previous findings in the literature by using an Euler-type equation as an example. The importance of the results was clarified by applying them to some special cases of the studied equation. The fourth-order delay differential equations have great practical importance due to their wide applications in civil, mechanical, and aeronautical engineering. Research on this type of equation is still ongoing due to its remarkable importance in many fields. [ABSTRACT FROM AUTHOR]

Published

2023

8. New Conditions for Testing the Asymptotic Behavior of Solutions of Odd-Order Neutral Differential Equations with Multiple Delays.

Author

Masood, Fahd, Moaaz, Osama, Askar, Sameh S., and Alshamrani, Ahmad

Subjects

*DELAY differential equations, *DIFFERENTIAL equations, *FUNCTIONAL differential equations

Abstract

The purpose of this research is to investigate the asymptotic and oscillatory characteristics of odd-order neutral differential equation solutions with multiple delays. The relationship between the solution and its derivatives of different orders, as well as their related functions, must be understood in order to determine the oscillation terms of the studied equation. In order to contribute to this subject, we create new and significant relationships and inequalities. We use these relationships to create conditions in which positive and N-Kneser solutions of the considered equation are excluded. To obtain these terms, we employ the comparison method and the Riccati technique. Furthermore, we use the relationships obtained to create new criteria, so expanding the existing literature on the field. Finally, we provide an example from the general case to demonstrate the results' significance. The findings given in this work provide light on the behavior of odd-order neutral differential equation solutions with multiple delays. [ABSTRACT FROM AUTHOR]

Published

2023

9. Study of Thermoelectric Responses of a Conductive Semi-Solid Surface to Variable Thermal Shock in the Context of the Moore–Gibson–Thompson Thermoelasticity.

Author

Megahid, Sami F., Abouelregal, Ahmed E., Askar, Sameh S., and Marin, Marin

Subjects

*THERMAL shock, *OHM'S law, *THERMAL stresses, *THERMOELASTICITY, *ANGULAR velocity, *ELASTIC solids, *HEAT waves (Meteorology)

Abstract

In this study, the Moore–Gibson–Thompson (MGT) concept of thermal conductivity is applied to a two-dimensional elastic solid in the form of a half-space. This model was constructed using Green and Naghdi's thermoelastic model to address the infinite velocity problem of heat waves. It has been taken into account that the free surface of the medium is immersed in an electromagnetic field of constant intensity, undergoes thermal shock, and rotates with a uniform angular velocity. The governing equations of a modified version of Ohm's law account for the impact of temperature gradients and charge densities. By using the method of normal mode analysis, an analytical representation of the studied physical fields was obtained. The effect of rotation and the modulus of modified Ohm's law on the responses of the field distributions examined is discussed, along with accompanying graphical representations. Other thermoelastic models have been compared with the results of the proposed system when the relaxation time is ignored. [ABSTRACT FROM AUTHOR]

Published

2023

10. Fourth-Order Emden–Fowler Neutral Differential Equations: Investigating Some Qualitative Properties of Solutions.

Author

Alatwi, Mansour, Moaaz, Osama, Askar, Sameh S., Alshamrani, Ahmad M., and Elabbasy, Elmetwally M.

Subjects

*DIFFERENTIAL equations, *FUNCTIONAL differential equations

Abstract

In this article, we investigate some of the qualitative properties of a class of fourth-order neutral differential equations. We start by obtaining new inequalities and relations between the solution and its corresponding function, as well as with its derivatives. The new relations allow us to improve the monotonic and asymptotic properties of the positive solutions of the studied equation. Then, using an improved approach, we establish new criteria that test the oscillation of all solutions. We also rely on the principle of symmetry between positive and negative solutions to obtain the new criteria. The paper provides illustrative examples that highlight the significance of our findings. [ABSTRACT FROM AUTHOR]

Published

2023

11. Generalized MGT Heat Transfer Model for an Electro-Thermal Microbeam Lying on a Viscous-Pasternak Foundation with a Laser Excitation Heat Source.

Author

Abouelregal, Ahmed E., Marin, Marin, and Askar, Sameh S.

Subjects

*HEAT transfer, *HEAT conduction, *LASER pulses, *HEAT pulses, *HEAT equation, *Q-switched lasers, *THERMOPHYSICAL properties, *DEFLECTION (Mechanics)

Abstract

In this study, the effects of laser light on the heat transfer of a thin beam heated by an applied current and voltage are investigated. Laser heating pulses are simulated as endogenous heat sources with discrete temporal properties. The heat conduction equation is developed using the energy conservation equation and the modified Moore–Gibson–Thompson (MGT) heat flow vector. Thermal and structural analysis of Euler–Bernoulli microbeams is provided with the support of visco-Pasternak's base with three parameters. Using the Laplace transform method, an approximation of an analytical solution is found for the field variables being examined. A comparison was made of the impacts of laser pulse length, the three foundation coefficients, and the thermal parameters on the responses to changes in measured thermophysical fields, such as deflection and temperature. [ABSTRACT FROM AUTHOR]

Published

2023

12. Analysis of the magneto-thermoelastic vibrations of rotating Euler–Bernoulli nanobeams using the nonlocal elasticity model.

Author

Abouelregal, Ahmed E., Marin, Marin, and Askar, Sameh S.

Subjects

*ELASTICITY, *THERMOELASTICITY, *ANGULAR velocity, *THERMAL conductivity, *MAGNETIC fields, *FREE convection, *PHONONS

Abstract

This paper introduces size-dependent modeling and investigation of the transverse vibrational behavior of rotating thermoelastic nanobeams by means of nonlocal elasticity theory. In the formulation, a model of thermal conductivity with two-phase delays (DPL) was utilized. By incorporating the interactions between phonons and electrons, this model took into account microstructural influences. Also, we have employed the state-space approach and Laplace transform approach to solve the governing equations, which were developed in the context of the nonlocal Eringen model. The nanobeam material is subjected to a changeable temperature field produced by the graphene tape attached to the nanobeam and connected to an electrical source. In addition, the nanobeam material is fully encompassed by an axially applied magnetic field. It has been revealed how coefficients such as the rotational angular velocity of the nanobeam, nonlocal coefficient, voltage, electrical resistance, and applied magnetic field influence its behavior. [ABSTRACT FROM AUTHOR]

Published

2023

13. Diamond Alpha Hilbert-Type Inequalities on Time Scales.

Author

El-Deeb, Ahmed A., Baleanu, Dumitru, Askar, Sameh S., Cesarano, Clemente, and Abdeldaim, Ahmed

Subjects

*JENSEN'S inequality, *INTEGRAL inequalities, *DIAMONDS

Abstract

In this article, we will prove some new diamond alpha Hilbert-type dynamic inequalities on time scales which are defined as a linear combination of the nabla and delta integrals. These inequalities extend some known dynamic inequalities on time scales, and unify and extend some continuous inequalities and their corresponding discrete analogues. Our results will be proven by using some algebraic inequalities, diamond alpha Hölder inequality, and diamond alpha Jensen's inequality on time scales. [ABSTRACT FROM AUTHOR]

Published

2022

14. A Dynamic Duopoly Model: When a Firm Shares the Market with Certain Profit.

Author

Askar, Sameh S.

Subjects

*MARKET share, *DYNAMIC models, *DEMAND function, *PROFIT-sharing, *PROFIT

Abstract

The current paper analyzes a competition of the Cournot duopoly game whose players (firms) are heterogeneous in a market with isoelastic demand functions and linear costs. The first firm adopts a rationally-based gradient mechanism while the second one chooses to share the market with certain profit in order to update its production. It trades off between profit and market share maximization. The equilibrium point of the proposed game is calculated and its stability conditions are investigated. Our studies show that the equilibrium point becomes unstable through period doubling and Neimark–Sacker bifurcation. Furthermore, the map describing the proposed game is nonlinear and noninvertible which lead to several stable attractors. As in literature, we have provided an analytical investigation of the map's basins of attraction that includes lobes regions. [ABSTRACT FROM AUTHOR]

Published

2020

15. Local and Global Dynamics of a Constraint Profit Maximization for Bischi–Naimzada Competition Duopoly Game.

Author

Askar, Sameh S and Al-Khedhairi, Abdulrahman

Subjects

*PROFIT maximization, *ATTRACTORS (Mathematics), *ECONOMIC models, *POINCARE maps (Mathematics), *GAMES, *MOTIVATION (Psychology), *COMPUTER simulation

Abstract

The Bischi–Naimzada game is a market competition between two firms with the objective of maximizing profits under limited information. In this article, we study a more generalized and realistic situation that takes into account the sales constraints. we generalize the economic model suggested by Bischi–Naimzada by introducing and studying the maximization of profits based on sales constraints. Our motivation in this paper is the studying of profit and sales constraints maximization and their influences on the game's dynamics. The local stability of the equilibrium points of the proposed model is discussed. It examines how the dynamics of the proposed two-dimensional competition game model focusing on changes in both the speed of the adjustment and the sales constraint parameters. The map describing the game is proven to be noninvertible and yields many multi-stable, complex dynamics and the coexistence chaotic attractors may arise. The global behavior of the map is achieved by studying the critical curves. The numerical simulations demonstrate the coexistence of two attractors and complex structures of the attraction basins. Several examples are discussed in order to confirm all the analytical results obtained. [ABSTRACT FROM AUTHOR]

Published

2020

16. The Influences of Asymmetric Market Information on the Dynamics of Duopoly Game.

Author

Askar, Sameh S.

Subjects

*INFORMATION asymmetry, *PREDICTION markets, *INFLUENCER marketing, *ATTRACTORS (Mathematics), *GAMES

Abstract

We investigate the complex dynamic characteristics of a duopoly game whose players adopt a gradient-based mechanism to update their outputs and one of them possesses in some way certain information about his/her opponent. We show that knowing such asymmetric information does not give any advantages but affects the stability of the game's equilibrium points. Theoretically, we prove that the equilibrium points can be destabilized through Neimark-Sacker followed by flip bifurcation. Numerically, we prove that the map describing the game is noninvertible and gives rise to several stable attractors (multistability). Furthermore, the dynamics of the map give different shapes of quite complicated attraction basins of periodic cycles. [ABSTRACT FROM AUTHOR]

Published

2020

17. Dynamic Effects Arise Due to Consumers' Preferences Depending on Past Choices.

Author

Askar, Sameh S. and Al-khedhairi, A.

Subjects

*CONSUMER preferences, *UTILITY functions, *TIME series analysis, *COMPUTER simulation

Abstract

We analyzed a dynamic duopoly game where players adopt specific preferences. These preferences are derived from Cobb–Douglas utility function with the assumption that they depend on past choices. For this paper, we investigated two possible cases for the suggested game. The first case considers only focusing on the action done by one player. This action reduces the game's map to a one-dimensional map, which is the logistic map. Using analytical and numerical simulation, the stability of fixed points of this map is studied. In the second case, we focus on the actions applied by both players. The fixed points, in this case, are calculated, and their stability is discussed. The conditions of stability are provided in terms of the game's parameters. Numerical simulation is carried out to give local and global investigations of the chaotic behavior of the game's map. In addition, we use a statistical measure, such as entropy, to get more evidences on the regularity and predictability of time series associated with this case. [ABSTRACT FROM AUTHOR]

Published

2020

18. An Algorithm of Image Encryption Using Logistic and Two-Dimensional Chaotic Economic Maps.

Author

Askar, Sameh S., Karawia, Abdel A., Al-Khedhairi, Abdulrahman, and Al-Ammar, Fatemah S.

Subjects

*IMAGE encryption, *ALGORITHMS, *CHAOS theory, *CRYPTOGRAPHY, *ROBUST control, *ENTROPY

Abstract

In the literature, there are many image encryption algorithms that have been constructed based on different chaotic maps. However, those algorithms do well in the cryptographic process, but still, some developments need to be made in order to enhance the security level supported by them. This paper introduces a new cryptographic algorithm that depends on a logistic and two-dimensional chaotic economic map. The robustness of the introduced algorithm is shown by implementing it on several types of images. The implementation of the algorithm and its security are partially analyzed using some statistical analyses such as sensitivity to the key space, pixels correlation, the entropy process, and contrast analysis. The results given in this paper and the comparisons performed have led us to decide that the introduced algorithm is characterized by a large space of key security, sensitivity to the secret key, few coefficients of correlation, a high contrast, and accepted information of entropy. In addition, the results obtained in experiments show that our proposed algorithm resists statistical, differential, brute-force, and noise attacks. [ABSTRACT FROM AUTHOR]

Published

2019

19. Kneser-Type Oscillation Criteria for Half-Linear Delay Differential Equations of Third Order.

Author

Masood, Fahd, Cesarano, Clemente, Moaaz, Osama, Askar, Sameh S., Alshamrani, Ahmad M., and El-Metwally, Hamdy

Subjects

*DELAY differential equations, *OSCILLATIONS

Abstract

This paper delves into the analysis of oscillation characteristics within third-order quasilinear delay equations, focusing on the canonical case. Novel sufficient conditions are introduced, aimed at discerning the nature of solutions—whether they exhibit oscillatory behavior or converge to zero. By expanding the literature, this study enriches the existing knowledge landscape within this field. One of the foundations on which we rely in proving the results is the symmetry between the positive and negative solutions, so that we can, using this feature, obtain criteria that guarantee the oscillation of all solutions. The paper enhances comprehension through the provision of illustrative examples that effectively showcase the outcomes and implications of the established findings. [ABSTRACT FROM AUTHOR]

Published

2023

20. New Conditions for Testing the Oscillation of Fourth-Order Differential Equations with Several Delays.

Author

Muhib, Ali, Moaaz, Osama, Cesarano, Clemente, and Askar, Sameh S.

Subjects

*RICCATI equation, *OSCILLATIONS, *DIFFERENTIAL equations, *DELAY differential equations, *FUNCTIONAL differential equations

Abstract

In this paper, we establish oscillation theorems for all solutions to fourth-order neutral differential equations using the Riccati transformation approach and some inequalities. Some new criteria are established that can be used in cases where known theorems fail to apply. The approach followed depends on finding conditions that guarantee the exclusion of positive solutions, and as a result of the symmetry between the positive and negative solutions of the studied equation, we therefore exclude negative solutions. An illustrative example is given. [ABSTRACT FROM AUTHOR]

Published

2022

21. A Variety of Nabla Hardy's Type Inequality on Time Scales.

Author

El-Deeb, Ahmed A., Makharesh, Samer D., Askar, Sameh S., and Awrejcewicz, Jan

Subjects

*FRACTIONAL integrals, *INTEGRAL inequalities

Abstract

The primary goal of this research is to prove some new Hardy-type ∇-conformable dynamic inequalities by employing product rule, integration by parts, chain rule and (γ , a) -nabla Hölder inequality on time scales. The inequalities proved here extend and generalize existing results in the literature. Further, in the case when γ = 1 , we obtain some well-known time scale inequalities due to Hardy inequalities. Many special cases of the proposed results are obtained and analyzed such as new conformable fractional h-sum inequalities, new conformable fractional q-sum inequalities and new classical conformable fractional integral inequalities. [ABSTRACT FROM AUTHOR]

Published

2022

22. Efficient Ranking-Based Whale Optimizer for Parameter Extraction of Three-Diode Photovoltaic Model: Analysis and Validations.

Author

Abdel-Basset, Mohamed, Mohamed, Reda, El-Fergany, Attia, Askar, Sameh S., and Abouhawwash, Mohamed

Subjects

*STANDARD deviations, *MODEL validation, *WHALES, *MATHEMATICAL optimization

Abstract

Efficient and accurate estimations of unidentified parameters of photovoltaic (PV) models are essential to their simulation. This study suggests two new variants of the whale optimization algorithm (WOA) for identifying the nine parameters of the three-diode PV model. The first variant abbreviated as RWOA is based on integrating the WOA with ranking methods under a novel updating scheme to utilize each whale within the population as much as possible during the optimization process. The second variant, namely HWOA, has been based on employing a novel cyclic exploration-exploitation operator with the RWOA to promote its local and global search for averting stagnation into local minima and accelerating the convergence speed in the right direction of the near-optimal solution. Experimentally, RWOA and HWOA are validated on a solar cell (RTC France) and two PV modules (Photowatt-PWP201 and Kyocera KC200GT). Further, these proposed variants are compared with five well-known parameter extraction models in order to demonstrate their notable advantages over the other existing competing algorithms for minimizing the root mean squared error (RMSE) between experimentally measured data and estimated one. The experimental findings show that RWOA is superior in some observed cases and superior in the other cases in terms of final accuracy and convergence speed; yet, HWOA is superior in all cases. [ABSTRACT FROM AUTHOR]

Published

2021