Category:Convex Hulls
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This category contains results about convex hulls.
Definitions specific to this category can be found in Definitions/Convex Hulls.
Let $V$ be a vector space over $\R$.
Let $U \subseteq V$.
Definition 1
The convex hull of $U$ is defined and denoted:
- $\ds \map {\operatorname {conv} } U = \set {\sum_{j \mathop = 1}^n \lambda_j u_j : n \in \N, \, u_j \in U \text { and } \lambda_j \in \R_{> 0} \text { for each } j, \, \sum_{j \mathop = 1}^n \lambda_j = 1}$
Definition 2
The convex hull of $U$ is defined and denoted:
- $\ds \map {\operatorname {conv} } U = $ the intersection of all convex sets $C \subseteq V$ of $V$ such that $U \subseteq C$.
Definition 3
The convex hull of $U$ is defined and denoted:
- $\ds \map {\operatorname {conv} } U = $ the smallest convex set $C$ such that $U \subseteq C$.
Subcategories
This category has the following 4 subcategories, out of 4 total.
C
- Closed Convex Hulls (2 P)
R
- Radon Points (empty)
- Radon's Theorem (1 P)
Pages in category "Convex Hulls"
The following 4 pages are in this category, out of 4 total.