000307617 001__ 307617
000307617 005__ 20240928181424.0
000307617 0247_ $$aG:(GEPRIS)16707525$$d16707525
000307617 035__ $$aG:(GEPRIS)16707525
000307617 040__ $$aGEPRIS$$chttp://gepris.its.kfa-juelich.de
000307617 150__ $$aInteractions between methods of local Banach space theory and infinite dimensional complex analysis$$y2005 - 2013
000307617 371__ $$aProfessor Dr. Andreas Defant
000307617 450__ $$aDFG project G:(GEPRIS)16707525$$wd$$y2005 - 2013
000307617 5101_ $$0I:(DE-588b)2007744-0$$aDeutsche Forschungsgemeinschaft$$bDFG
000307617 680__ $$aAbout 1914 H. Bohr published fundamental articles on the theory of Dirichlet series and created a close relationship between analytic number theory and complex analysis. In particular, Bohr¿s power series theorem has stimulated a series of interesting papers in recent years, which gives hope to an unexpected strong connection of modern Banach space theory, the so-called local theory, with infinite dimensional complex analysis. From the present state-of¿the-art of research and our preparatory work, a fruitful interaction between local Banach space theory and complex analysis has crystallized. The top aim of our project is to get a better understanding of this relationship. This includes connections with number theory, combinatorics, probability theory and the theory of partial differential equations on complex manifolds.
000307617 909CO $$ooai:juser.fz-juelich.de:974492$$pauthority$$pauthority:GRANT
000307617 909CO $$ooai:juser.fz-juelich.de:974492
000307617 980__ $$aG
000307617 980__ $$aAUTHORITY