Inverse Problem with Integral Overdetermination for System of Equations of Kelvin-Voight Fluids

Khompysh Khonatbek

doi:10.4028/www.scientific.net/AMR.705.15

Paper Titles

Preface and Organizing Committees

New Mortar for Clay Masonry Structures
p.3

Quantitative Determination of Arsenate in Dried Shrimp by Spectrophotometric Measurement of its Heteropoly Blue
p.9

Inverse Problem with Integral Overdetermination for System of Equations of Kelvin-Voight Fluids
p.15

Effect of Strain Rate on Mechanical Properties of Pure Iron
p.21

Determining of Corrosion Resistance of Alloyed Earth Plateproduced by New Electro Deposition Method
p.26

Analytical Solutions Using a Higher-Order Refined Theory for the Static Analysis of Functionally Graded Material Plates
p.30

Digital Studying of Surface Groove on the Pipe Hydroforming Process in Cross Shaped Joint Production
p.36

Cross Shaped Hydroforming Process Comparing of Finite Element Methodand Practical Works
p.41

HomeAdvanced Materials ResearchAdvanced Materials Research Vol. 705Inverse Problem with Integral Overdetermination...

Inverse Problem with Integral Overdetermination for System of Equations of Kelvin-Voight Fluids

Abstract:

In the paper we consider an inverse problem for the three-dimensional nonlinear pseudoparabolic equations describing the Kelvin-Voight motion. The inverse problem consists of finding a velocity field and pressure which is gradient and also a right-hand said of the equation. Additional condition about the solution to the inverse problem is given in the form of integral overdetermination condition. The existence and uniqueness of weak generalized solution of this inverse problem in the sobelev space is proved.