Dr. Ramy Ramadan Mahmoud Mohammed

Contact Information
Phone number: 084 6338462 - 084 6344264
Fax number: 084 6370025
E-mail Address : rrm00@fayoum.edu.eg
Office: Faculty of Science – Mathematical Department .
Postal Address : Fayoum – Fayoum University – Faculty of Science - Mathematics Department - POBox : 63514

Academic Qualifications

2001—2005: B. Sc. In Mathematics, Department of Mathematics, Faculty of Science, Fayoum University.

2007—2008: Pre-Master studies of Science-Mathematics Department of Mathematics, Faculty of Science, Fayoum University.

2009—2013: M. Sc. In Mathematics (Partial Differential Equations) Department of Mathematics, Faculty of Science, Fayoum University.

2013—2016: Ph. D. In Mathematics (Differential Equations) Department of Mathematics, Faculty of Science, Fayoum University.

Academic Positions

Demonstrator: from 2005 To 2013

Assistant Lecturer : from 2013 To 2016

Lecturer : from 2016 Up Till Now

Theses

On some boundary value problems for elliptic equations in nonsmooth regions in Sobolev and Holder spaces.

Dynamic Inequalities on Time Scales

Puplications

M. J. Bohner, R. R. Mahmoud and S. H. Saker, Discrete, Continuous, Delta, Nabla, And Diamond–Alpha Opial Inequalities, Mathematical Inequalities and Applications, 18 (3) (2015), 923-940.

M. J. Bohner, Ramy R. Mahmoud, and Samir H. Saker, Improvements of dynamic Opial-type inequalities and applications, Dynamic Systems and Applications 24 (2015), 229-242

S. H. Saker, R. R. Mahmoud, and A. Peterson, A new Picone’s dynamic inequality on time scales with applications, Applied Mathematics Letters 48 (2015), 162-169.

S. H. Saker, R. R. Mahmoud and A. Peterson, Weighted Hardy-type inequalities on time scales with applications, Mediterranean Journal of Mathematics 13 (2016), 585-606.

John R. Graef, Ramy R. Mahmoud, Samir H. Saker, Ercan Tunc, Some New Lyapunov-type Inequalities for Third Order Differential Equations, Communications on Applied Nonlinear Analysis 22 (2) (2015), 1-16.

S. H. Saker, and R. R. Mahmoud, Distribution Of Zeros Of Sublinear Dynamic Equations With A Damping Term On Time Scales, Hacettepe Journal of Mathematics and Statistics 45 (2) (2016), 455 – 471.

S. H. Saker, R. R. Mahmoud, and A. Peterson, Some Bennett–Copson Type Inequalities On Time Scales, Journal of Mathematical Inequalities 10 (2) (2016), 471–489

S. H. Saker, R. R. Mahmoud, M. M. Osman and R. P. Agarwal, Some New Generalized Forms Of Hardy'S Type, Mathematical Inequalities and Applications (accepted).

S. H. Saker, R. R. Mahmoud, and A. Peterson, A Unified Approach To Copson and Beesack Type, (submitted).

S. H. Saker, R. R. Mahmoud, and A. Peterson, New Generalizations Of Németh-Mohapatra Type Inequalities On Time Scales, (submitted).

New generalizations of Németh–Mohapatra type inequalities on time scales

Some Reversed Hardy-Type Inequalities on Time Scales

New Carlson-Bellman and Hardy-Littlewood dynamic inequalities

A connection between weighted Hardy’s inequality and half-linear dynamic Equations

Factorization Theorems of Cesàro and Copson Spaces on Time Scales

Boundedness Of Both Discrete Hardy And Hardy–Littlewood Maximal Operators Via Muckenhoupt Weights

Characterizations of weighted dynamic Hardy-type inequalities with higher-order derivatives

A unified approach to dynamic Hardy-type and Copson-type inequalities

Research Interests

Dynamic Equations on Time Scales.

Dynamic Inequalities on Time Scales.

Ordinary/Partial Differential equations.