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An Inverse Almost Periodic Problem for a Semilinear Strongly Damped Wave Equation

Irina Kmit, Nataliya Protsakh, Viktor Tkachenko

Abstract

The paper investigates an inverse boundary value problem for a semilinear strongly damped wave equation with the Dirichlet boundary condition in Sobolev spaces of bounded (in particular, almost periodic and periodic) functions. In addition to finding a weak solution, we also determine a source coefficient in the right-hand side of the differential equation. To make the problem well-posed, an integral-type overdetermination condition is imposed. After reducing the inverse problem to a direct one, we solve the latter in several steps. First, we prove the existence and uniqueness of a weak solution to the corresponding initial-boundary value problem on a finite time interval. Next, we show that this solution can be extended in a bounded way to the semiaxis $t\ge 0$. In the following step, we further extend this bounded solution to all $t\in R$. Finally, we establish that if the data of the original problem are almost periodic (or periodic), then the resulting bounded weak solution is itself almost periodic (or periodic).

An Inverse Almost Periodic Problem for a Semilinear Strongly Damped Wave Equation

Abstract

The paper investigates an inverse boundary value problem for a semilinear strongly damped wave equation with the Dirichlet boundary condition in Sobolev spaces of bounded (in particular, almost periodic and periodic) functions. In addition to finding a weak solution, we also determine a source coefficient in the right-hand side of the differential equation. To make the problem well-posed, an integral-type overdetermination condition is imposed. After reducing the inverse problem to a direct one, we solve the latter in several steps. First, we prove the existence and uniqueness of a weak solution to the corresponding initial-boundary value problem on a finite time interval. Next, we show that this solution can be extended in a bounded way to the semiaxis . In the following step, we further extend this bounded solution to all . Finally, we establish that if the data of the original problem are almost periodic (or periodic), then the resulting bounded weak solution is itself almost periodic (or periodic).
Paper Structure (22 sections, 5 theorems, 138 equations)

This paper contains 22 sections, 5 theorems, 138 equations.

Key Result

Theorem 1.2

Let Conditions (A1)--(A5) be satisfied. Then the following statements hold.

Theorems & Definitions (9)

  • Definition 1.1
  • Theorem 1.2
  • Lemma 2.1
  • Remark 2.1
  • Definition 2.2
  • Theorem 2.3
  • Definition 2.4
  • Theorem 2.5
  • Lemma 2.6