Skip to main navigation
Skip to search
Skip to main content
Penn State Home
Help & FAQ
Home
Researchers
Research output
Research units
Equipment
Grants & Projects
Prizes
Activities
Search by expertise, name or affiliation
Flux Norm Approach to Finite Dimensional Homogenization Approximations with Non-Separated Scales and High Contrast
Leonid Berlyand
, Houman Owhadi
Mathematics
Materials Research Institute (MRI)
Center for Computational Mathematics and Applications (CCMA)
Center for Interdisciplinary Mathematics
Research output
:
Contribution to journal
›
Article
›
peer-review
57
Scopus citations
Overview
Fingerprint
Fingerprint
Dive into the research topics of 'Flux Norm Approach to Finite Dimensional Homogenization Approximations with Non-Separated Scales and High Contrast'. Together they form a unique fingerprint.
Sort by
Weight
Alphabetically
Keyphrases
High Contrast
100%
Finite-dimensional
100%
PDE
100%
Solution Set
66%
Finite-dimensional Approximation
66%
Material Properties
33%
Convergence Rate
33%
Scalar
33%
Approximate Solution
33%
L2 Norm
33%
Galerkin Method
33%
Error Estimates
33%
Coordinate Change
33%
Elliptic Equations
33%
Elliptic Operators
33%
Finite-dimensional Space
33%
Mathematical Concepts
33%
Periodic Coefficients
33%
Roughness Coefficient
33%
Media Models
33%
Approximation Space
33%
Piecewise Polynomial
33%
Mathematics
Partial Differential Equation
100%
Polynomial
33%
Elliptic Equation
33%
Error Estimate
33%
Homogenization Result
33%
Convergence Rate
33%
Elliptic Operator
33%
Finite-Dimensional Space
33%
Mathematical Concept
33%
Change of Coordinate
33%