A linear mapping is a mapping \(f:V \to W\) between \({\mathbb K}\) -vector spaces V  and W with the property \(f(\lambda v + w) = \lambda f(v) + f(w)\) for all \(\lambda \in {\mathbb K}\) and \(v, w \in V\) .

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Linear Mappings and Representation Matrices

  • Christian Karpfinger

摘要

A linear mapping is a mapping \(f:V \to W\) between \({\mathbb K}\) -vector spaces V  and W with the property \(f(\lambda v + w) = \lambda f(v) + f(w)\) for all \(\lambda \in {\mathbb K}\) and \(v, w \in V\) .