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PlanetPhysics/Vector Space 2

From Wikiversity

Let be a field (or, more generally, a division ring). A vector space over is a set with two operations, and , such that

  1. for all
  2. for all
  3. There exists an element such that for all
  4. For any , there exists an element such that
  5. for all and
  6. for all
  7. for all and
  8. for all and

Equivalently, a vector space is a module over a ring which is a field (or, more generally, a division ring).

The elements of are called vectors, and the element is called the zero vector of .

This entry is a copy of the GNU FDL vector space article from PlanetMath. Author of the original article: djao. History page of the original is here