Homogenization of the higher-order Schrödinger-type equations with periodic coefficients
From MaRDI portal
Publication:2055127
DOI10.4171/ECR/18-1/24zbMath1479.35064arXiv2011.13382OpenAlexW4236401607MaRDI QIDQ2055127
Publication date: 3 December 2021
Full work available at URL: https://arxiv.org/abs/2011.13382
One-parameter semigroups and linear evolution equations (47D06) Homogenization in context of PDEs; PDEs in media with periodic structure (35B27) Higher-order elliptic equations (35J30)
Related Items
Cites Work
- Unnamed Item
- Unnamed Item
- Spectral approach to homogenization of nonstationary Schrödinger-type equations
- On operator estimates for some problems in homogenization theory
- Estimates of homogenization for a parabolic equation with periodic coefficients
- Spectral approach to homogenization of hyperbolic equations with periodic coefficients
- Perturbation theory for linear operators.
- On operator estimates in homogenization theory
- On homogenization of periodic parabolic systems
- Homogenization of the fourth-order elliptic operator with periodic coefficients with correctors taken into account
- Estimates in homogenization of higher-order elliptic operators
- Operator estimates in homogenization theory
- Operator error estimates for homogenization of fourth order elliptic equations
- Operator error estimates in the homogenization problem for nonstationary periodic equations
- Homogenization of periodic differential operators of high order
- Homogenization of high order elliptic operators with periodic coefficients
- Homogenization with corrector term for periodic elliptic differential operators
- Second order periodic differential operators. Threshold properties and homogenization
- Operator error estimates for homogenization of the nonstationary Schrödinger-type equations: sharpness of the results
- Threshold approximations for the resolvent of a polynomial nonnegative operator pencil
- Homogenization with corrector for periodic differential operators. Approximation of solutions in the Sobolev class $H^1({\mathbb{R}}^d)$
