Profile of a Touch-Down solution to a nonlocal MEMS model with critical parameters

Abstract

This work investigates a mathematical model arising in the study of MEMS devices, described by the following parabolic equation on [0,T)×: ∂t v = v + λ(1-v)2( 1 + γ ∫ 11-v\, dx )2 , 0 ≤ v ≤ 1, where ⊂ RN is a bounded domain and λ, γ > 0. We construct a solution with a prescribed profile, which quenches in finite time T at exactly one interior point a ∈ . Moreover, we are able to provide an asymptotic description of the quenching profile. We reformulate the problem as a blow-up problem to utilize the techniques employed in Merle, Zaag in 1997, Duong, Zaag in 2019 and Duong, Ghoul, Kavallaris, Zaag 2022. The proof proceeds through two principal steps: a reduction to a finite-dimensional dynamical system and a classical topological argument employing index theory. The main challenge lies in managing the nonlocal integral term, which generates an additional gradient term when the problem is transformed into the blow-up framework.

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