|Place of birth||Shinaband village, Lerik region, Azerbaijan Republic|
|Date of birth||18.08.1973|
|Education||Baku State University, Applied Mathematics and Cybernetics|
|Scientific degree||Doctor of mathematics|
|Topic of PhD thesis:
- specialty code
- specialty name
- topic name
Mathematical modeling, numerical methods and complex of programsNumerical Solution of Optimal Control Problems with Intermediate Conditions
|Total number of printed scientific publications:
- number of scientific publications printed abroad:
- number of papers published in journals indexed and abstracted in international databases
|Number of patents and certificates of authorship|
- number of PhD
|Basic scientific achievements||We have proposed a numerical method (shiftingtechnique) of solution to the problems described by a system of ordinary differential equations with nonseparated multipoint conditions.
We have proposed a numerical method of solution to Cauchy and boundary-value problems described by a system of multipoint loaded ordinary differential equations involving nonseparated conditions.
We have proposed a numerical method (folding technique) of solution to the problems described by a system of ordinary and loaded differential equations with multipoint nonseparated point and integral conditions.
We have investigated feedback control problems for systems with lumped and distributed parameters on the basis of observations, as well as proposed an approach to solution to these problems and obtained formulas for their numerical solution.
We have considered optimal control problems with respect to the processes described by a system of ordinary and loaded differential equations with multipoint nonseparated point and integral conditions, as well as obtained necessary optimality conditions and proposed a numerical algorithm of solution to these problems.
We have proposed an approach to numerical solution to boundary-value problems with respect to loaded ordinary and partial differential equations involving nonlocal point and integral conditions.
We have proposed an approach to numerical solution to inverse problems with respect to loaded ordinary and partial differential equations involving nonlocal conditions.
We have investigated optimal control problems for systems with distributed parameters involving nonlocal conditions, as well as obtained necessary optimality conditions and described a numerical algorithm of their solution.
A method for the numerical solution of inverse problems with nonlocal conditions.
|Names of scientific works||
|Membership with international and foreign scientific organizations||EUROPT - The Continuous Optimization Working Group of EURO http://www.iam.metu.edu.tr/EUROPT/|
|Pedagogical activity||Since 2005, Azerbaijan State Oil Academy|
|Awards and prizes|
|Main place of work and its address||Institute of Control Systems ANAS, 9, B.Vaxabzade str., Baku, AZ1141, Azerbaijan Republic|
|Office phone||(+994 12) 5399231|
|Mobile||(+994 50) 3964841|
|Home phone||(+994 12) 4323826|