The main known results on differentiability of continuous convex operators ff from a Banach space XX to an ordered Banach space YY are due to J.M. Borwein and N.K. Kirov. Our aim is to prove some “supergeneric” results, i.e., to show that, sometimes, the set of Gâteaux or Fréchet nondifferentiability points is not only a first-category set, but also smaller in a stronger sense. For example, we prove that if YY is countably Daniell and the space L(X,Y)L(X,Y) of bounded linear operators is separable, then each continuous convex operator f:X→Yf:X→Y is Fréchet differentiable except for a Γ-null angle-small set. Some applications of such supergeneric results are shown.
On differentiability of convex operators / L. Vesely, L. Zajicek. - In: JOURNAL OF MATHEMATICAL ANALYSIS AND APPLICATIONS. - ISSN 0022-247X. - 402:1(2013), pp. 12-22.
On differentiability of convex operators
L. VeselyPrimo
;
2013
Abstract
The main known results on differentiability of continuous convex operators ff from a Banach space XX to an ordered Banach space YY are due to J.M. Borwein and N.K. Kirov. Our aim is to prove some “supergeneric” results, i.e., to show that, sometimes, the set of Gâteaux or Fréchet nondifferentiability points is not only a first-category set, but also smaller in a stronger sense. For example, we prove that if YY is countably Daniell and the space L(X,Y)L(X,Y) of bounded linear operators is separable, then each continuous convex operator f:X→Yf:X→Y is Fréchet differentiable except for a Γ-null angle-small set. Some applications of such supergeneric results are shown.
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