Determining the memory kernel from a fixed point measurement data for a parabolic equation with memory effect
From MaRDI portal
Publication:725816
DOI10.1007/s40314-017-0427-zzbMath1394.35583OpenAlexW2591216858MaRDI QIDQ725816
Zewen Wang, Jun Yu, Bin Wu, Si-Yuan Wu
Publication date: 2 August 2018
Published in: Computational and Applied Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s40314-017-0427-z
Inverse problems for PDEs (35R30) Wave equation (35L05) Second-order hyperbolic equations (35L10) Integro-partial differential equations (35R09)
Related Items (4)
Global existence, exponential decay and finite time blow-up of solutions for a class of semilinear pseudo-parabolic equations with conical degeneration ⋮ New general decay results for a Moore–Gibson–Thompson equation with memory ⋮ Well-posedness and exponential stability of a thermoelastic-Bresse system with second sound and delay ⋮ General decay rates for a laminated beam with memory
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Lack of controllability of the heat equation with memory
- Error analysis in the reconstruction of a convolution kernel in a semilinear parabolic problem with integral overdetermination
- Reconstruction of a convolution kernel in a semilinear parabolic problem based on a global measurement
- Null controllability of nonlinear heat equation with memory effects
- Identification of the memory kernel in the strongly damped wave equation by a flux condition
- An identification problem with evolution on the boundary of parabolic type
- Construction of a class of integral models for heat flow in materials with memory
- Well-posedness of the weak formulation for the phase-field model with memory
- An inverse problem for a parabolic integrodifferential model in the theory of combustion
- Memory Driven Instability in a Diffusion Process
- On a Finite Difference Scheme for an Inverse Integro-Differential Problem Using Semigroup Theory: A Functional Analytic Approach
- Identification of two memory kernels in a fully hyperbolic phase-field system
- Recovering memory kernels in parabolic transmission problems
- Stefan and Hele-Shaw type models as asymptotic limits of the phase-field equations
- A GLOBAL IN TIME EXISTENCE AND UNIQUENESS RESULT FOR A SEMILINEAR INTEGRODIFFERENTIAL PARABOLIC INVERSE PROBLEM IN SOBOLEV SPACES
- An inverse problem for the strongly damped wave equation with memory
- Identification of two memory kernels and the time dependence of the heat source for a parabolic conserved phase‐field model
This page was built for publication: Determining the memory kernel from a fixed point measurement data for a parabolic equation with memory effect
