College of Science / Department of Mathematics

د.عايد حسين حويل العظامات


Associate Professor
د.عايد حسين حويل العظامات

Curriculum Vitae
  • Major: (Mathematical Analysis (Differential Equations
  • College: College of Science
  • Department(s): Mathematics Department
  • E-mail: ayed.h.aledamat@ahu.edu.jo
  • Phone No.: 00962797550295

Name: Ayed Hussein Huwail Al e'damat . 

Academic rank: Associate Professor. (Since June./2020)

 Nationality: Jordanian.

 Date of Birth: Jan./1/1976.

 Place of Birth: Alkom alahmer/Mafraqe/Jordan.

 Address:                    

Al-Hussein Bin Talal University

Faculty of Science

Department of Mathematics

Phone №: +962-3-2179000, Ext.7525

Postal Address: P.O. Box 20, Ma'an, Jordan

 E-mail: ayed.h.aledamat@ahu.edu.jo

 Mobile №: +962-797550295

 Ma’an, Jordan  .

                              Web Site: http://www.ahu.edu.jo

1.  Mathematical Analysis (/ Differential Equations, Real Analysis, 

      Numerical Analysis and Measure Theory). 

2. Applications of Linear and Nonlinear Systems of Ordinary and partial Differential Equations. 

3. Mathematical Modeling for Physical and Natural Phenomena.

Oscillations of solutions of nonlinear second-order stochastic differential equations
  • Research Summary
    • In this paper, we study the oscillatory properties for asymptotic behaviors of solutions of a class of nonlinear second-order stochastic Itô equations. Meanwhile, we investigate existence of zeros of its solutions with probability 1. Sufficient conditions for the oscillation and nonoscillation of solutions are obtained on the half-line [t0,∞) for every t0 > 0.
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Analytical-Numerical Solutions for First-Order Periodic Boundary Value Problems Using the Reproducing Kernel Algorithm
  • Research Summary
    • This paper proposes an efficient numerical algorithm to obtain an approximate solution of first-order periodic boundary value problems. This new algorithm is based on a reproducing kernel Hilbert space method. Its exact solution is calculated in the form of series in reproducing kernel space with easily computable components. In addition, convergence analysis for this method is discussed. In this sense, some numerical examples are given to show the effectiveness and performance of the proposed method. The results reveal that the method is quite accurate, simple, straightforward, and convenient to handle a various range of differential equations.
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Spanning Trees on Decorated Centered Cubic Lattices
  • Research Summary
    • In this paper we compute the number of spanning trees on the following decorated centred cubic lattices; base- centred cubic, side- centered cubic and edge- centred cubic lattices. For these lattices we also determine the asymptotic growth constant.
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Analytical- numerical method for solving a class of two- point boundary value problems
  • Research Summary
    • In this paper, we applied analytical-numerical method to approximate solutions of two-point boundary value problems of fourth-order Volterra integrodifferential equations based on the reproducing kernel theory . The solution is represented in the form of convergent series with easily computable components. The solution methodology is based on generating the orthogonal basis from the obtained kernel function in the space W5 2 [a, b]. The n-term approximation is obtained and proved to converge to the analytical solution. Moreover, the proposed method has an advantage that it is possible to pick any point in the interval of integration and as well the approximate solutions and its all derivatives will be applicable. Numerical examples are given to demonstrate the computation efficiency of the presented method. Results obtained by the method indicate the method is simple and effective
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Approximation scheme for handling coupled systems of Differential Equations within Reproducing Kernel Method
  • Research Summary
    • This paper proposes an efficient numerical method to obtain analytical-numerical solutions for a class of system of boundary value problems. This new algorithm is based on a reproducing kernel Hilbert space method. The analytical solution is calculated in the form of series in reproducing kernel space with easily computable components. In addition, convergence analysis for this method is discussed. In this sense, some numerical examples are given to show the effectiveness and performance of the proposed method. The results reveal that the method is quite accurate, simple, straightforward, and convenient to handle a various range of differential equations.
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An Alternative Proof of the Spectral Radius Inequality for Products of Hilbert Space Operators
  • Research Summary
    • In this paper, we present a new alternative proof of the spectral radius inequality theorem for products of Hilbert space operators due to F. Kittaneh, in which the spectral radius of 𝐴 obtained by using the formula 𝑟 𝐴 = lim𝑛→∞ 𝐴 𝑛 1 𝑛 , where . represents any operator norm. Then, we use this alternative technique to prove some related results. Indeed, the spectral radius inequalities presented in this paper have diverse applications.
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* CONFERENCES :

 1.      The International Arab Conference on mathematics and computations"IACMC",  Zarqa University, Jordan, Apr. 23-25, 2014.

 2.     International Conference on Differential ana Difference  Equations and Applications .Military academy, Amadora , Portugal, May 18-22, 2015. 

3.      International Conference on Recent Advances in Pure and Applied Mathematics  (ICRAPAM 2017 ), Istanbul Commerce  University, the Turkish Academy of Science (TUBA) ,  Kusadasi - AYDIN/TURKEY, May 11-15, 2017 .

1- End Note Program ( 6 hours ), 30/7/2017-1/8/2017 . Faculty Development Center, Al Hussein Bin Talal University .
2- Development of competencies of the performance of faculty members,
    (30 hours ) , 4/2/2018-8/2/2018 . Faculty Development Center, Al Hussein Bin Talal University .

3-The right bases in the teaching process( 10 hours ) , 8/2/2018-14/2/2018 .Faculty Development Center, Al Hussein Bin Talal University .
 

* GRADUATE COMMITTEES :

-  Member, Master degree in Mathematics for Mohammad Ali Al-Neimat, Reproducing Kernel Hilbert Space for Certain Class of  Boundary Value Problems, Theories and Applications, Al-Hussein Bin Talal University, December/2018

Academic COMMITTEES :

1-Graduate Studies Committee, Mathematics Department, 2016-2018.

2-Appointment and Promotion Committee Mathematics Department ,2017/2018.

3-Member of the Community Support Committee at the Faculty of Science

3-Member of the Faculty of Science Committee, 2018-2019.


1-  Supervisor for Khaled Bakheet Al-Smeheen . A study of  Bounded 

                          and Continuous Linear Operator in Random Normed 

                        Space . Al-Hussein Bin Talal University.

2- Supervisor for Salem Jihad Bni Ali,  Sobolev space ; Theories and Applications . Al-Hussein Bin Talal University.

3-Supervisor for  Ameera Saleh Batayneh, Lp Spaces ;Definitions,Properties and Applications. Al-Hussein Bin Talal University.

4- Supervisor for  Rojana Al nawafleh, STUDY ABOUT FREDHOLM OPERATORS IN SOBOLEV SPACES.  Al-Hussein Bin Talal University.

5- Supervisor, Hala Saleh Al saeedyeen SOME IMPORTANT INEQUALITES IN SOBOLEV SPACES AND IT'S APPLICATIONS.  Al-Hussein Bin Talal University.

6- Supervisor, Rawan Al darawsheh , A Study About Compact Operators and Singular Value Decoposition In some Measur Spaces  .  Al-Hussein Bin Talal University.

7- Supervisor, Suhaib Al Harahsheh, A Study about Fourier Analysis and Measure Theory. Al-Hussein Bin Talal University.

8- Supervisor, Malak Al Sa'aidan  , A Study about Convergence in Distribution For The Probability Spaces in  Mathematical Analysis   .  Al-Hussein Bin Talal University.

9- Supervisor, ABDULLAH HIKMAT MARDI AL-KHRESHAH,  CONTINUITY OF SOLUTIONS TO BOUNDARY-VALUE PROBLEMS FOR SYSTEMS OFORDINARY DIFFERENTIAL EQUATIONS IN SOBOLEV SPACES . Al-Hussein Bin Talal University.

* Teacher in ministry of education for 9 years.

Al-Hussein Bin Talal University/ Jordan. /December /7/2014- Till Now

* Associate Professor. /June/24/2020 – Till Now.

- Supervisor in ministry of education for 6 years.  

- Al-Hussein Bin Talal University/ Jordan.

- Head of the Dept. of  Mathematics :

* Mar/2017-  Sep/2018

 Calculus ,   Number Theory , Mathematical Analysis(Complex Analysis, Real Analysis , Differential Equations, Measure theory , Numerical Analysis,  Functional Analysis  ) ,     Topology,    History of mathematics.

 

Under Graduate Courses: 

1.     Calculus (1)

2.     Calculus (2)

3.   Calculus (3)

4.     Advanced Calculus

5.      Real Analysis.

6.      Complex Analysis(1).

7.     Number Theory .

8.     Mathematical Analysis(1)

9.     Mathematical Analysis (2)

10.     Topology .

11.   Functional Analysis .

12.   History of mathematics.

13. Real Analysis (1)

14. Real Analysis (2) 

15. Pre-calculus


 

 

Graduate Courses

 

1-    Functional  Analysis.

2-     Lebesgue Measure and Integration Theory.

3- Special Subjects in Functional Analysis. 

 

Academic qualifications and certificates

  * EDUCATION :

1. PhD degree in Mathematics/ Mathematical Analysis –Differential Equations, 2013, Damascus University, Syria.

Dissertation Title: A study about finding solutions and stability of ordinary linear differential equations.

 

2. Master degree Mathematics, 2005, Al albeit University, Jordan.

Dissertation Title: Osscilation of second order functional differential equations.

 

3. Bachelor degree in Mathematics, 1998, Yarmouk University, Jordan.

office hours

12:30-2:00

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