Continuity properties up to a countable partition.

Moltó, Aníbal, et al. "Continuity properties up to a countable partition.." RACSAM 100.1-2 (2006): 279-294. <http://eudml.org/doc/41655>.

@article{Moltó2006,
abstract = {Approximation and rigidity properties in renorming constructions are characterized with some classes of simple maps. Those maps describe continuity properties up to a countable partition. The construction of such kind of maps can be done with ideas from the First Lebesgue Theorem. We present new results on the relationship between Kadec and locally uniformly rotund renormability as well as characterizations of the last one with the simple maps used here.},
author = {Moltó, Aníbal, Orihuela, José, Troyanski, Stanimir, Valdivia, Manuel},
journal = {RACSAM},
keywords = {locally uniformly rotund renormings; slicely continuous maps},
language = {eng},
number = {1-2},
pages = {279-294},
title = {Continuity properties up to a countable partition.},
url = {http://eudml.org/doc/41655},
volume = {100},
year = {2006},
}

TY - JOUR
AU - Moltó, Aníbal
AU - Orihuela, José
AU - Troyanski, Stanimir
AU - Valdivia, Manuel
TI - Continuity properties up to a countable partition.
JO - RACSAM
PY - 2006
VL - 100
IS - 1-2
SP - 279
EP - 294
AB - Approximation and rigidity properties in renorming constructions are characterized with some classes of simple maps. Those maps describe continuity properties up to a countable partition. The construction of such kind of maps can be done with ideas from the First Lebesgue Theorem. We present new results on the relationship between Kadec and locally uniformly rotund renormability as well as characterizations of the last one with the simple maps used here.
LA - eng
KW - locally uniformly rotund renormings; slicely continuous maps
UR - http://eudml.org/doc/41655
ER -