Affine-linear mapping/Barycentric combination/Fact/Proof

Proof

Let ${}V$ and ${}W$ denote the vector spaces for ${}E$ and for ${}F$ , respectively. Suppose first that ${}\psi$ is affine-linear with linear part

\psi _{0}\colon V\longrightarrow W.

Let a barycentric combination ${}\sum _{i\in I}a_{i}P_{i}$ with ${}P_{i}\in E$ and ${}\sum _{i\in I}a_{i}=1$ be given. Then we have (with an arbitrary point ${}Q\in E$ )

{}{\begin{aligned}\psi {\left(\sum _{i\in I}a_{i}P_{i}\right)}&=\psi {\left(Q+\sum _{i\in I}a_{i}{\overrightarrow {QP_{i}}}\right)}\\&=\psi (Q)+\psi _{0}{\left(\sum _{i\in I}a_{i}{\overrightarrow {QP_{i}}}\right)}\\&=\psi (Q)+\sum _{i\in I}a_{i}\psi _{0}{\left({\overrightarrow {QP_{i}}}\right)}\\&=\psi (Q)+\sum _{i\in I}a_{i}{\overrightarrow {\psi (Q)\psi (P_{i})}}\\&=\sum _{i\in I}a_{i}\psi (P_{i}).\end{aligned}}

Now, suppose that the mapping ${}\psi$ is compatible with barycentric combinations. We set

{}\varphi (v):={\overrightarrow {\psi (P)\psi (P+v)}}\,

for ${}v\in V$ , where ${}P\in E$ is any point. We first show that this is independent of the chosen point ${}P$ . For another point ${}Q\in E$ , the sum