Inverse Problems of Identifying the Unknown Transverse Shear Force in the Euler-Bernoulli Beam with Kelvin-Voigt Damping

TL;DR

This paper investigates how Kelvin-Voigt damping influences the process of identifying unknown transverse shear forces in a damped Euler-Bernoulli beam using boundary measurements, employing regularization and adjoint problem techniques.

Contribution

It introduces a novel analysis of Kelvin-Voigt damping's regularizing effect on inverse shear force problems in Euler-Bernoulli beams, including solution existence and differentiability of the associated functionals.

Findings

Unique solutions for the inverse problems are established.

The regularized functionals are shown to be Fréchet differentiable.

Kelvin-Voigt damping reduces regularity requirements for boundary data.

Abstract

In this paper, we study the inverse problems of determining the unknown transverse shear force $g(t)$ in a system governed by the damped Euler-Bernoulli equation $\rho(x)u_{tt}+\mu(x)u_t+ (r(x)u_{xx})_{xx}+ (\kappa(x)u_{xxt})_{xx}=0, ~(x,t)\in (0,\ell)\times(0,T],$ subject to the boundary conditions $u(0,t) =0$, $u_{x}(0,t)=0$, $\left[r(x)u_{xx}+\kappa(x)u_{xxt}\right]_{x=\ell} =0$, $-\left[\big(r(x)u_{xx}+\kappa(x)u_{xxt}\big)_{x}\right]_{x=\ell}=g(t)$, $t\in [0,T]$, from the measured deflection $\nu(t):=u(\ell,t)$, $t \in [0,T]$, and from the bending moment $\omega(t):=-\left( r(0)u_{xx}(0,t)+\kappa(0)u_{xxt}(0,t) \right)$, $t \in [0,T]$, where the terms $(\kappa(x)u_{xxt})_{xx}$ and $\mu(x)u_t$ account for the Kelvin-Voigt damping and external damping, respectively. The main purpose of this study is to analyze the Kelvin-Voigt damping effect on determining the unknown transverse shear force (boundary input) through the given boundary measurements. The inverse problems are transformed into minimization problems for Tikhonov functionals, and it is shown that the regularized functionals admit unique solutions for the inverse problems. By suitable regularity on the admissible class of shear force $g(t),$ we prove that these functionals are Fr\'echet differentiable, and the derivatives are expressed through the solutions of corresponding adjoint problems posed with measured data as boundary data associated with the direct problem. The solvability of these adjoint problems is obtained under the minimal regularity of the boundary data $g(t)$, which turns out to be the regularizing effect of the Kelvin-Voigt damping in the direct problem.