INVESTIGADORES
SALINAS Oscar Mario
artículos
Título:
A look at BMO(phi)(w) through Carleson measures
Autor/es:
ELEONOR HARBOURE; OSCAR SALINAS; BEATRIZ VIVIANI
Revista:
JOURNAL OF FOURIER ANALYSIS AND APPLICATIONS
Editorial:
Springer
Referencias:
Año: 2007 vol. 13 p. 267 - 284
ISSN:
1069-5869
Resumen:
As Fefferman and Stein showed, there is a tight connection
between Carleson measures and BMO functions. In this
work we extend this type of results to the more general scope of
the BMO´(!) spaces. As a by product a weighted version of the
TriebelLizorkin space ÿF01;2 is introduced, which turns to be isomorphic
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
TriebelLizorkin space ÿF01;2 is introduced, which turns to be isomorphic
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
TriebelLizorkin space ÿF01;2 is introduced, which turns to be isomorphic
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
TriebelLizorkin space ÿF01;2 is introduced, which turns to be isomorphic
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
TriebelLizorkin space ÿF01;2 is introduced, which turns to be isomorphic
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
work we extend this type of results to the more general scope of
the BMO´(!) spaces. As a by product a weighted version of the
TriebelLizorkin space ÿF01;2 is introduced, which turns to be isomorphic
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
TriebelLizorkin space ÿF01;2 is introduced, which turns to be isomorphic
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
TriebelLizorkin space ÿF01;2 is introduced, which turns to be isomorphic
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
TriebelLizorkin space ÿF01;2 is introduced, which turns to be isomorphic
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
TriebelLizorkin space ÿF01;2 is introduced, which turns to be isomorphic
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
work we extend this type of results to the more general scope of
the BMO´(!) spaces. As a by product a weighted version of the
TriebelLizorkin space ÿF01;2 is introduced, which turns to be isomorphic
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
TriebelLizorkin space ÿF01;2 is introduced, which turns to be isomorphic
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
TriebelLizorkin space ÿF01;2 is introduced, which turns to be isomorphic
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
TriebelLizorkin space ÿF01;2 is introduced, which turns to be isomorphic
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
TriebelLizorkin space ÿF01;2 is introduced, which turns to be isomorphic
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
work we extend this type of results to the more general scope of
the BMO´(!) spaces. As a by product a weighted version of the
TriebelLizorkin space ÿF01;2 is introduced, which turns to be isomorphic
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
TriebelLizorkin space ÿF01;2 is introduced, which turns to be isomorphic
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
TriebelLizorkin space ÿF01;2 is introduced, which turns to be isomorphic
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
TriebelLizorkin space ÿF01;2 is introduced, which turns to be isomorphic
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
TriebelLizorkin space ÿF01;2 is introduced, which turns to be isomorphic
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
work we extend this type of results to the more general scope of
the BMO´(!) spaces. As a by product a weighted version of the
TriebelLizorkin space ÿF01;2 is introduced, which turns to be isomorphic
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
TriebelLizorkin space ÿF01;2 is introduced, which turns to be isomorphic
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
TriebelLizorkin space ÿF01;2 is introduced, which turns to be isomorphic
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
TriebelLizorkin space ÿF01;2 is introduced, which turns to be isomorphic
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
TriebelLizorkin space ÿF01;2 is introduced, which turns to be isomorphic
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
between Carleson measures and BMO functions. In this
work we extend this type of results to the more general scope of
the BMO´(!) spaces. As a by product a weighted version of the
TriebelLizorkin space ÿF01;2 is introduced, which turns to be isomorphic
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
TriebelLizorkin space ÿF01;2 is introduced, which turns to be isomorphic
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
TriebelLizorkin space ÿF01;2 is introduced, which turns to be isomorphic
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
TriebelLizorkin space ÿF01;2 is introduced, which turns to be isomorphic
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
TriebelLizorkin space ÿF01;2 is introduced, which turns to be isomorphic
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
work we extend this type of results to the more general scope of
the BMO´(!) spaces. As a by product a weighted version of the
TriebelLizorkin space ÿF01;2 is introduced, which turns to be isomorphic
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
TriebelLizorkin space ÿF01;2 is introduced, which turns to be isomorphic
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
TriebelLizorkin space ÿF01;2 is introduced, which turns to be isomorphic
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
TriebelLizorkin space ÿF01;2 is introduced, which turns to be isomorphic
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
TriebelLizorkin space ÿF01;2 is introduced, which turns to be isomorphic
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
work we extend this type of results to the more general scope of
the BMO´(!) spaces. As a by product a weighted version of the
TriebelLizorkin space ÿF01;2 is introduced, which turns to be isomorphic
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
TriebelLizorkin space ÿF01;2 is introduced, which turns to be isomorphic
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
TriebelLizorkin space ÿF01;2 is introduced, which turns to be isomorphic
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
TriebelLizorkin space ÿF01;2 is introduced, which turns to be isomorphic
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
TriebelLizorkin space ÿF01;2 is introduced, which turns to be isomorphic
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
work we extend this type of results to the more general scope of
the BMO´(!) spaces. As a by product a weighted version of the
TriebelLizorkin space ÿF01;2 is introduced, which turns to be isomorphic
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
TriebelLizorkin space ÿF01;2 is introduced, which turns to be isomorphic
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
TriebelLizorkin space ÿF01;2 is introduced, which turns to be isomorphic
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
TriebelLizorkin space ÿF01;2 is introduced, which turns to be isomorphic
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
TriebelLizorkin space ÿF01;2 is introduced, which turns to be isomorphic
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
to BMO(!) as in the unweighted case.
work we extend this type of results to the more general scope of
the BMO´(