Function spaces in Lipschitz domains and on Lipschitz manifolds. Characteristic functions as pointwise multipliers.

Triebel, Hans. "Function spaces in Lipschitz domains and on Lipschitz manifolds. Characteristic functions as pointwise multipliers.." Revista Matemática Complutense 15.2 (2002): 475-524. <http://eudml.org/doc/44356>.

@article{Triebel2002,
abstract = {Function spaces of type Bspq and Fspq cover as special cases classical and fractional Sobolev spaces, classical Besov spaces, Hölder-Zygmund spaces and inhomogeneous Hardy spaces. In the last 2 or 3 decades they haven been studied preferably on Rn and in smooth bounded domains in Rn including numerous applications to pseudodifferential operators, elliptic boundary value problems etc. To a lesser extent spaces of this type have been considered in Lipschitz domains. But in recent times there is a growing interest to study and to use spaces of this type in Lipschitz domains and on their boundaries. It is the aim of this paper to deal with function spaces of Bspq and Fspq type in Lipschitz domains and on Lipschitz manifolds in a systematic (although not comprehensive) way: We describe and comment on known results, seal some gaps, give new proofs, and add a few new results of relevant aspects.},
author = {Triebel, Hans},
journal = {Revista Matemática Complutense},
keywords = {Espacios de funciones lineales; Espacios de Sobolev; Dominios de Lipschitz; Multiplicadores; Besov spaces; Lizorkin-Triebel spaces; embeddings; compactness of embeddings; pointwise multipliers; traces},
language = {eng},
number = {2},
pages = {475-524},
title = {Function spaces in Lipschitz domains and on Lipschitz manifolds. Characteristic functions as pointwise multipliers.},
url = {http://eudml.org/doc/44356},
volume = {15},
year = {2002},
}

TY - JOUR
AU - Triebel, Hans
TI - Function spaces in Lipschitz domains and on Lipschitz manifolds. Characteristic functions as pointwise multipliers.
JO - Revista Matemática Complutense
PY - 2002
VL - 15
IS - 2
SP - 475
EP - 524
AB - Function spaces of type Bspq and Fspq cover as special cases classical and fractional Sobolev spaces, classical Besov spaces, Hölder-Zygmund spaces and inhomogeneous Hardy spaces. In the last 2 or 3 decades they haven been studied preferably on Rn and in smooth bounded domains in Rn including numerous applications to pseudodifferential operators, elliptic boundary value problems etc. To a lesser extent spaces of this type have been considered in Lipschitz domains. But in recent times there is a growing interest to study and to use spaces of this type in Lipschitz domains and on their boundaries. It is the aim of this paper to deal with function spaces of Bspq and Fspq type in Lipschitz domains and on Lipschitz manifolds in a systematic (although not comprehensive) way: We describe and comment on known results, seal some gaps, give new proofs, and add a few new results of relevant aspects.
LA - eng
KW - Espacios de funciones lineales; Espacios de Sobolev; Dominios de Lipschitz; Multiplicadores; Besov spaces; Lizorkin-Triebel spaces; embeddings; compactness of embeddings; pointwise multipliers; traces
UR - http://eudml.org/doc/44356
ER -