A Mathematics graduate from the University of Vienna, Austria. I coupled my targets with performance and other obligations. I have a mathematical background with numerical computational approach. Many engineering problems are modeled by partial dierential equations. I have the skills and ability to relate a wide range of real world problems into such mathematical models. These challenging tasks in computing and research eld can be solved with the required technical skills, dedication and hard work. For example, in an economy or in nancial engineering problems, we have limited resources with unlimited want. In order to get the maximum possible outcome to meet our desire we need to ensure the optimum use of our resources. Therefore, business model optimization (BMO) in the alignment of partial dierential equations and numerical methods can play an idolized role to resolve such type of concerns. In my Ph.D, I designed a number of optimization models to deal with uncertainties in such models. These models are then solved by developing a package in MATLAB and AMPL (A Modeling Language for Mathematical Programming) environment. Furthermore, I have developed the personal attributes that will lead to my success as a good team player. These attributes are personal motivation, determination, creativity, patience and responsibility. Finally, we are in the 21st century and two entities namely, information and networking play a major role in success in each and every eld of life. Apart from teaching and research experience, I have extensive experience of information and networking of European educational system at university level specially in the eld of Mathematics. These skills can play a very important role while developing a bridge for student exchange programs between the universities.

Numerical methods applied to dierential equations; Mathematical modeling of applied problems; Finite element methods; Financial Mathematics; Optimization; General theory of Relativity and Cosmology; Dynamical system.