Home
About
Advanced Search
Browse by Discipline
Scientific Societies
E-print Alerts
Add E-prints
FAQ
•
HELP
•
SITE MAP
•
CONTACT US
Search
Advanced Search
Vybíral, Jan - Fakultät für Mathematik und Informatik, Friedrich-Schiller-Universität Jena
JohnsonLindenstrauss lemma for circulant matrices Aicke Hinrichs
On sharp embeddings of Besov and Triebel-Lizorkin spaces in the subcritical case
Sobolev and Jawerth embeddings for spaces with variable smoothness and integrability
A diagonal embedding theorem for function spaces with dominating mixed smoothness
Traces of Functions with a Dominating Mixed Derivative in R3 Jan Vybiral and Winfried Sickel
A REMARK ON BETTER -INEQUALITY JAN VYB IRAL
Sampling numbers and function spaces Jan Vybiral
Aicke Hinrichs Mathematisches Institut, Universitat Jena
A diagonal embedding theorem for function spaces with dominating mixed smoothness
OPTIMAL SOBOLEV EMBEDDINGS ON R n JAN VYB IRAL
Contents List of Figures . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . x
A new proof of the Jawerth-Franke embedding Jan Vybiral
Sampling numbers and function spaces Jan Vybral
Function spaces with dominating mixed smoothness
The JawerthFranke embedding of spaces with dominating mixed smoothness
Characterisations of function spaces with dominating mixed smoothness properties
On dilation operators and sampling numbers Jan Vybral
On dilation operators and sampling numbers Jan Vybiral
Corrigenda to the paper: "On approximation numbers of Sobolev
Traces of Functions with a Dominating Mixed Derivative in R 3 Jan Vybral and Winfried Sickel
A new proof of the JawerthFranke embedding Jan Vybral
On sharp embeddings of Besov and TriebelLizorkin spaces in the subcritical case
Widths of embeddings in function spaces Jan Vybiral
Johnson-Lindenstrauss lemma for circulant matrices Aicke Hinrichs
On dilation operators in TriebelLizorkin spaces Cornelia Schneider Jan Vybral
WEAK ESTIMATES CANNOT BE OBTAINED BY EXTRAPOLATION STANISLAV HENCL, JAN MAL
Corrigenda to the paper: ''On approximation numbers of Sobolev
Characterisations of function spaces with dominating mixed smoothness properties
Widths of embeddings in function spaces Jan Vybral
Faculty of Mathematics and Physics Charles University
WEAK ESTIMATES CANNOT BE OBTAINED BY EXTRAPOLATION STANISLAV HENCL, JAN MALY, LUBOS PICK AND JAN VYBIRAL
On dilation operators in Triebel-Lizorkin spaces Cornelia Schneider Jan Vybral
The Jawerth-Franke embedding of spaces with dominating mixed smoothness
OPTIMAL SOBOLEV EMBEDDINGS ON Rn JAN VYBIRAL
Sobolev and Jawerth embeddings for spaces with variable smoothness and integrability
