Existence of solutions for stress-rate type strain-limiting viscoelasticity in Gevrey spaces

Abstract: In this work, we deal with a one-dimensional stress-rate type model for the response of viscoelastic materials, in relation to the strain-limiting theory. The model is based on a constitutive relation of stress-rate type. Unlike classical models in elasticity, the unknown of the model under consideration is uniquely the stress, avoiding the use of the deformation. Here, we treat the case of periodic boundary conditions for a linearized model. We determine an optimal function space that ensures the local existe… Show more

“…Specifically, Bachman et al . [ 63 ] consider a one-dimensional stress-rate type model, which is reminiscent of Truesdell’s hypoelasticity; it implies a balance of forces expressed by a peculiar partial differential equation with homogeneous Neumann’s boundary conditions; its initial data are selected in a Gevrey’s class with regularity. Under these conditions, local existence of solutions to the pertinent linearization are determined around certain steady-state states.…”

Foundational issues, analysis and geometry in continuum mechanics: introduction

“…Specifically, Bachman et al . [ 63 ] consider a one-dimensional stress-rate type model, which is reminiscent of Truesdell’s hypoelasticity; it implies a balance of forces expressed by a peculiar partial differential equation with homogeneous Neumann’s boundary conditions; its initial data are selected in a Gevrey’s class with regularity. Under these conditions, local existence of solutions to the pertinent linearization are determined around certain steady-state states.…”

Foundational issues, analysis and geometry in continuum mechanics: introduction