Article

Problem of Determining the Two-Dimensional Kernel of the Viscoelasticity Equation with a Weakly Horizontal Inhomogeneity

D. K. DurdievRomanovskii Institute of Mathematics, Uzbekistan Academy of Sciences, Tashkent, 100170, UzbekistanJ. Sh. SafarovRomanovskii Institute of Mathematics, Uzbekistan Academy of Sciences, Tashkent, 100170, Uzbekistan

Journal of Applied and Industrial Mathematicsjournal2022en

ABI

Abstract

In a domain bounded with respect to the variable $$ z $$ and having a weakly horizontal inhomogeneity, we consider the problem of determining the convolution kernel $$ k(t,x) $$ , $$ t\in [0,T] $$ , $$ x\in {\mathbb R} $$ , occurring in the viscoelasticity equation. It is assumed that this kernel weakly depends on the variable $$ x $$ and has a power series expansion in a small parameter $$ \varepsilon $$ . A method is constructed for finding the first two coefficients $$ k_{0}(t) $$ and $$ k_{1 }(t) $$ of this expansion. Theorems on the global unique solvability of the problem are obtained.

Topics

Elasticity and Wave Propagation Advanced Numerical Analysis Techniques Mathematical Analysis and Transform Methods

Identifiers

DOI: 10.1134/s1990478922010033

Citations and references

Cited by 3 30 references

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