We link the overconvergence properties of certain Taylor series in the unit disk to the maximality of their cluster sets, so connecting outer wild behavior to inner wild behavior. Specifically, it is proved the existence of a dense linear manifold of holomorphic functions in the disk that are, except for zero, universal Taylor series in the sense of Nestoridis and, simultaneously, have maximal cluster sets along many curves tending to the boundary. Moreover, it is constructed a dense linear manifold of universal Taylor series having, for each boundary point, limit zero along some path which is tangent to the corresponding radius. Finally, it is proved the existence of a closed infinite dimensional manifold of holomorphic functions enjoying the two-fold wild behavior specified at the beginning.

Publié le : 2009-06-15
Classification:  maximal cluster set,  universal Taylor series,  dense linear submanifold,  closed linear submanifold,  differential operator,  curve with non-total oscillation,  30B30,  30D40,  30E10,  47B38

@article{1255440074,
     author = {Bernal-Gonz\'alez
,  
Luis and Bonilla
,  
Antonio and Calder\'on-Moreno
,  
Mar\'\i a C. and Prado-Bassas
,  
Jos\'e A.},
     title = {Universal Taylor series with maximal cluster sets},
     journal = {Rev. Mat. Iberoamericana},
     volume = {25},
     number = {1},
     year = {2009},
     pages = { 757-780},
     language = {en},
     url = {http://dml.mathdoc.fr/item/1255440074}
}

Bernal-González
,  
Luis; Bonilla
,  
Antonio; Calderón-Moreno
,  
María C.; Prado-Bassas
,  
José A. Universal Taylor series with maximal cluster sets. Rev. Mat. Iberoamericana, Tome 25 (2009) no. 1, pp.  757-780. http://gdmltest.u-ga.fr/item/1255440074/