Weekly seminar on April 15, 2015, 10.00 will feature a report by Yuliy D. Chashechkin, professor Institute for Problems in Mechanics of Russian Academy of Sciences entitled “Differential fluid mechanics – a new generation of models ”. The development of remote sensing technology, optical and acoustic instruments for flow visualization at the laboratory have firmly […]
13/04/2015
1.РЖ.Математика.Сводный том..-2015- № 32.Дифференциальные уравнения.-2015-т.51.№ 23.Доклады РАН-2015-т.460 № 64 .Математический сборник -2015- т.206 № 35.Сибирский математический журнал-2015 т.56 № 16.Известия РАН.Механика твердого тела.- 2015- № 1
13/04/2015
On 10.04.2015 at the Dissertation Council of IMM of ANAS the doctoral candidate of the Institute Leyla Mammadova defended the dissertation on the theme “Direct and inverse problems for a bundle of quadratic Sturm-Liouville operators with generalized function coefficient” in speciality “Differential Equations” and Orkhan Aliyev on “Exceptionability sets of elliptic and parabolic equation in […]
The weekly Wednesday seminar on 08 April 2015, 10.00 a.m., featured Professor Sabir Mirzoyev (Department of Functional Analysis, IMM) who talk about «Solvability of operator-differential equations and some spectral problems ». In the talk, we study the solvability of boundary-value problems for operator-differential equations and some properties of the corresponding operator pencils.
The head of “Differential Equations” department of IMM doct.phys.math.sci.prof. Akper Aliyev was on professional trip at Moscow State University in Moscow from March 28 to April 01, 2015. On March 30, 2015 at the faculty of Calculation Mathematics and Cybernetics of Moscow State University, at the seminar under the guidance of acad. E.I. Moiseev and […]
The weekly Wednesday seminar on 08 April 2015, 10.00 a.m., will feature Professor Sabir Mirzoyev (Department of Functional Analysis, IMM) who will talk about «Solvability of operator-differential equations and some spectral problems ». In the talk, we study the solvability of boundary-value problems for operator-differential equations and some properties of the corresponding operator pencils.