A Note on Holomorphic Functions of Bounded Type in Fréchet Spaces

Let X be a Banach space. Let ?i,.(X\*) the M e t space whose elements are the holomorphic functions defined on X\* whose restrictions to each multiple mB(X\*), m = 1,2, . . . , of the closed unit ball B ( X \* ) of X\* are continuous for the weak-star topology. A fundamental Hystem of norms for this

Let D be a bounded symmetric domain of tube type and 7 be the Shilov boundary of D. Denote by H 2 (D) and A 2 (D) the Hardy and Bergman spaces, respectively, of holomorphic functions on D; and let B(H 2 (D)) and B(A 2 (D)) denote the closed unit balls in these spaces. For an integer l 0 we define th

Let f be a continuous convex function on a Banach space E. This paper shows that every proper convex function g on E with g F f is generically Frechet differentiable if and only if the image of the subdifferential map Ѩ f of f has the Radon᎐Nikodym property, and in this case it is equivalent to show