# A Gevrey class semigroup, exponential decay and Lack of analyticity for a system formed by a Kirchhoff-Love plate equation and the equation of a membrane-like electric network with indirect fractional damping

**Authors:** Fredy Maglorio Sobrado Su\'arez, Filomena Barbosa Rodrigues Mendes

arXiv: 1908.04826 · 2025-10-24

## TL;DR

This paper investigates the decay and analyticity properties of a coupled Kirchhoff-Love plate and electric network system with fractional damping, revealing exponential decay and Gevrey class regularity depending on the damping parameter.

## Contribution

It establishes the Gevrey class regularity and analyticity properties of the semigroup generated by the system, depending on the fractional damping parameter, which was not previously known.

## Key findings

- The semigroup is not analytic for ; it is analytic at .
- The system exhibits exponential decay for all .
- Gevrey class regularity depends on the damping parameter .

## Abstract

The emphasis in this paper is on the Coupled System of a Kirchhoff-Love Plate Equation with the Equation of a Membrane-like Electrical Network, where the coupling is of higher order given by the Laplacian of the displacement velocity $\gamma\Delta u_t$ and the Laplacian of the potential electric field $\gamma\Delta v_t $, here only one of the equations is conservative, and the other has dissipative properties. The mechanism was dissipative is given by an intermediate damping $(-\Delta)^\theta v_t$ between the potential electric $\theta=0$ (frictional damping) and the Laplacian of the electric potential for $\theta=1$ (damping Kelvin Voigt). We show that $S(t)=e^{\mathbb{B}t}$ is not analytic for $\theta\in [0, 1[$ and analytic for $\theta=1$, however $S(t)=e^{\mathbb{B}t}$ decays exponentially for $0\leq \theta \leq 1$ and $S(t)$ is of Gevrey sharp class $s>\frac{1}{\theta}$ when the parameter $\theta$ lies in the interval $]0,1[$.

## Full text

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## References

31 references — full list in the complete paper: https://tomesphere.com/paper/1908.04826/full.md

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Source: https://tomesphere.com/paper/1908.04826