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Noun Concept

Categories: Abelian group theory, Articles with short description, Geometric algorithms, Convex geometry, Affine geometry

EN

Minkowski addition Minkowski difference Minkowski sum

EN

In geometry, the Minkowski sum of two sets of position vectors A and B in Euclidean space is formed by adding each vector in A to each vector in B: A + B = { a + b | a ∈ A, b ∈ B } {\displaystyle A+B=\{\mathbf {a} +\mathbf {b} \,|\,\mathbf {a} \in A,\ \mathbf {b} \in B\}} The Minkowski difference is the corresponding inverse, where {\displaystyle } produces a set that could be summed with B to recover A. This is defined as the complement of the Minkowski sum of the complement of A with the reflection of B about the origin. Wikipedia

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EN

In geometry, the Minkowski sum of two sets of position vectors A and B in Euclidean space is formed by adding each vector in A to each vector in B: A + B = { a + b | a ∈ A, b ∈ B } {\displaystyle A+B=\{\mathbf {a} +\mathbf {b} \,|\,\mathbf {a} \in A,\ \mathbf {b} \in B\}} The Minkowski difference is the corresponding inverse, where {\displaystyle } produces a set that could be summed with B to recover A. This is defined as the complement of the Minkowski sum of the complement of A with the reflection of B about the origin. Wikipedia

A sum of two subsets of a vector space Wikipedia Disambiguation

Sums vector sets A and B by adding each vector in A to each vector in B Wikidata

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EN

Minkowski addition