Barrier cone
In mathematics, specifically functional analysis, the barrier cone is a cone associated to any non-empty subset of a Banach space. It is closely related to the notions of support functions and polar sets.
Definition
Let X be a Banach space and let K be a non-empty subset of X. The barrier cone of K is the subset b(K) of X∗, the continuous dual space of X, defined by
- [math]\displaystyle{ b(K) := \left\{ \ell \in X^{\ast} \,\left|\, \sup_{x \in K} \langle \ell, x \rangle \lt + \infty \right. \right\}. }[/math]
Related notions
The function
- [math]\displaystyle{ \sigma_{K} \colon \ell \mapsto \sup_{x \in K} \langle \ell, x \rangle, }[/math]
defined for each continuous linear functional ℓ on X, is known as the support function of the set K; thus, the barrier cone of K is precisely the set of continuous linear functionals ℓ for which σK(ℓ) is finite.
The set of continuous linear functionals ℓ for which σK(ℓ) ≤ 1 is known as the polar set of K. The set of continuous linear functionals ℓ for which σK(ℓ) ≤ 0 is known as the (negative) polar cone of K. Clearly, both the polar set and the negative polar cone are subsets of the barrier cone.
References
- Aubin, Jean-Pierre (2009). Set-Valued Analysis (Reprint of the 1990 ed.). Boston, MA: Birkhäuser Boston Inc.. pp. xx+461. ISBN 978-0-8176-4847-3.
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