Abstract

We prove that under some topological assumptions (e.g. if M has nonempty interior in X), a convex cone M in a linear topological space X is a linear subspace if and only if each convex functional on M has a convex extension on the whole space X.

Full Text
Published version (Free)

Talk to us

Join us for a 30 min session where you can share your feedback and ask us any queries you have

Schedule a call

Similar Papers

Paper Title
Journal
Date
Author
Continuous linear images of pseudo-complete linear topological spaces
Aaron Todd
Pacific Journal of Mathematics | VOL. 63
Aaron ToddAaron Todd
01 Mar 1976
Sufficiency Conditions and a Duality Theory for Mathematical Programming Problems in Arbitrary Linear Spaces
Lucien W Neustadt
Nonlinear Programming | VOL. -
Lucien W NeustadtLucien W Neustadt
01 Jan 1970
On Convex Topological Linear Spaces
George W Mackey
Proceedings of the National Academy of Sciences | VOL. 29
George W MackeyGeorge W Mackey
15 Oct 1943
On convex topological linear spaces
George W Mackey
Transactions of the American Mathematical Society | VOL. 60
George W MackeyGeorge W Mackey
01 Jan 1946
View more papers

More From: Applicationes Mathematicae

Paper Title
Journal
Date
Author
A note on optimal joint prediction of order statistics
Alexander Zaigraev
Applicationes Mathematicae | VOL. -
Alexander ZaigraevAlexander Zaigraev
01 Jan 2024
On the $(m,t)$-extension dual complex Fibonacci $p$-numbers
Bandhu Prasad
Applicationes Mathematicae | VOL. -
Bandhu PrasadBandhu Prasad
01 Jan 2024
Non-zero-sum stochastic games with recursive utilities of risk-sensitive players
Andrzej S Nowak ... Anna Jaśkiewicz
Applicationes Mathematicae | VOL. -
Andrzej S Nowak, et. al.Andrzej S Nowak ... Anna Jaśkiewicz
01 Jan 2024
Extended comparison between two Newton–Jarratt sixth order schemes for nonlinear models under the same set of conditions
Janak Raj Sharma ... Sunil Kumar
Applicationes Mathematicae | VOL. 50
Janak Raj Sharma, et. al.Janak Raj Sharma ... Sunil Kumar
01 Jan 2023
View more papers