Skip to main navigation
Skip to search
Skip to main content
Tel Aviv University Home
Update Request & User Guide (TAU staff only)
Home
Experts
Research units
Research output
Prizes
Activities
Press/Media
Student theses
Search by expertise, name or affiliation
The Bramble-Hilbert lemma for convex domains
S. Dekel
*
,
D. Leviatan
*
Corresponding author for this work
School of Mathematical Sciences
RealTimeImage
Research output
:
Contribution to journal
›
Article
›
peer-review
37
Scopus citations
Overview
Fingerprint
Fingerprint
Dive into the research topics of 'The Bramble-Hilbert lemma for convex domains'. Together they form a unique fingerprint.
Sort by
Weight
Alphabetically
Keyphrases
Finite Element Method
100%
Convex Domain
100%
Bramble-Hilbert Lemma
100%
Approximation Methods
50%
Polynomial Approximation
50%
Application Method
50%
Quasi-uniform
50%
Finite Element Analysis
50%
Total Degree
50%
Blowing
50%
Sobolev Spaces
50%
Order-k
50%
Equivalent Diameter
50%
Nonlinear Approximation
50%
Piecewise Polynomial
50%
Bounded Convex Domain
50%
Multivariate Polynomial Approximation
50%
Sobolev Seminorm
50%
K-functional
50%
Uniform Geometry
50%
Numerical Solution of PDEs
50%
Mathematics
Convex Domain
100%
Hilbert's Lemma
100%
Polynomial
66%
Polynomial Approximation
66%
Finite Element Method
66%
Main Result
33%
Approximation Method
33%
Partial Differential Equation
33%
Numerical Solution
33%
Triangle
33%
Domain Element
33%
Fundamental Result
33%
Degree of Approximation
33%
Sobolev Space
33%
Nonlinear Approximation
33%
Seminorm
33%