On strongly separately continuous functions on sequence spaces

Abstract

We study strongly separately continuous real-valued function defined on the Banach spaces p. Determining sets for the class of strongly separately continuous functions on p are characterized. We prove that for every 1 α<ω1 there exists a strongly separately continuous function which belongs the (α+1)'th Baire class and does not belong to the α'th Baire class on p. We show that any open set in p is the set of discontinuities of a strongly separately continuous real-valued function.