Affine space/Affinely independence/Introduction/Section

Definition

Let ${}E$ be an affine space over a ${}K$ -vector space ${}V$ , and let

P_{1},\ldots ,P_{n}

be a finite family of points in ${}E$ . We say that this family of points is affinely independent, if an equality

{}\sum _{i=1}^{n}a_{i}P_{i}=\sum _{i=1}^{n}b_{i}P_{i}\,

wit

{}\sum _{i=1}^{n}a_{i}=\sum _{i=1}^{n}b_{i}=1\,

is only possible if

{}a_{i}=b_{i}\,

for all

{}i=1,\ldots ,n

.

Let ${}E$ be an affine space over a ${}K$ -vector space ${}V$ , and let

P_{1},\ldots ,P_{n}

denote a finite family of points in

{}E

. Then the following statements are equivalent.

The points ${}P_{1},\ldots ,P_{n}$ are affinely independent.
For every ${}i\in \{1,\ldots ,n\}$ , the family of vectors
${\overrightarrow {P_{i}P_{1}}},\ldots ,{\overrightarrow {P_{i}P_{i-1}}},\,{\overrightarrow {P_{i}P_{i+1}}},\ldots ,{\overrightarrow {P_{i}P_{n}}}$

is linearly independent.
There exists some ${}i\in \{1,\ldots ,n\}$ such that the family of vectors
${\overrightarrow {P_{i}P_{1}}},\ldots ,{\overrightarrow {P_{i}P_{i-1}}},\,{\overrightarrow {P_{i}P_{i+1}}},\ldots ,{\overrightarrow {P_{i}P_{n}}}$

is linearly independent.
The points ${}P_{1},\ldots ,P_{n}$ form an affine basis in the affine subspace generated by them.

\Box