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2. Vectorial addition chain - Wikipedia

   en.wikipedia.org/wiki/Vectorial_addition_chain

   An addition sequence for the set of integer S ={n 0, ..., n r-1} is an addition chain v that contains every element of S. For example, an addition sequence computing {47,117,343,499}

3. Vector addition system - Wikipedia

   en.wikipedia.org/wiki/Vector_addition_system

   A vector addition system (VAS) is one of several mathematical modeling languages for the description of distributed systems.Vector addition systems were introduced by Richard M. Karp and Raymond E. Miller in 1969, [1] and generalized to vector addition systems with states (VASS) by John E. Hopcroft and Jean-Jacques Pansiot in 1979. [2]

4. Minkowski addition - Wikipedia

   en.wikipedia.org/wiki/Minkowski_addition

   For Minkowski addition, the zero set, {}, containing only the zero vector, 0, is an identity element: for every subset S of a vector space, S + { 0 } = S . {\displaystyle S+\{0\}=S.} The empty set is important in Minkowski addition, because the empty set annihilates every other subset: for every subset S of a vector space, its sum with the ...

5. Multivector - Wikipedia

   en.wikipedia.org/wiki/Multivector

   In geometric algebra, a multivector is defined to be the sum of different-grade k-blades, such as the summation of a scalar, a vector, and a 2-vector. [17] A sum of only k-grade components is called a k-vector, [18] or a homogeneous multivector. [19] The highest grade element in a space is called a pseudoscalar.

6. Matrix addition - Wikipedia

   en.wikipedia.org/wiki/Matrix_addition

   In mathematics, matrix addition is the operation of adding two matrices by adding the corresponding entries together. For a vector , v → {\displaystyle {\vec {v}}\!} , adding two matrices would have the geometric effect of applying each matrix transformation separately onto v → {\displaystyle {\vec {v}}\!} , then adding the transformed vectors.

7. Shapley–Folkman lemma - Wikipedia

   en.wikipedia.org/wiki/Shapley–Folkman_lemma

   The Shapley–Folkman lemma is illustrated by the Minkowski addition of four sets. The point (+) in the convex hull of the Minkowski sum of the four non-convex sets (right) is the sum of four points (+) from the (left-hand) sets—two points in two non-convex sets plus two points in the convex hulls of two sets.