Cone-Monotone Functions: Differentiability and Continuity
Copyright policy ) Borwein, Jonathan M.; Wang, Xianfu;
Cone-Monotone Functions: Differentiability and Continuity
AbstractWe provide a porosity-based approach to the differentiability and continuity of real-valued functions on separable Banach spaces, when the function is monotone with respect to an ordering induced by a convex cone K with non-empty interior. We also show that the set of nowhere K-monotone functions has a σ-porous complement in the space of continuous functions endowed with the uniform metric.
Australia
- University of Newcastle Australia Australia
- University of British Columbia Canada
- Okanagan College Canada
- Dalhousie University Canada
Gâteaux differentiability, cone-monotone functions, directionally porous, separable space, Aronszajn null set, sets
Gâteaux differentiability, cone-monotone functions, directionally porous, separable space, Aronszajn null set, sets
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