2024年6月4日星期二

Basis compatible

Definition

is a finite-dimension vector space, is a basis for , for any subspace , we call is compatible with iff is a basis of .

Examples

  • is a basis of , the plane is the subspace , is a basis of ​, so compatible.
  • is a basis of , , is a basis of , compatible.
  • is a basis of , , , which implies that is not compatible with .

Property

For any subspace , there is a basis of which is both compatible with and .

proof:

As already known that any set of linearly independent vectors in can be expanded to a basis of , so

, , .​

We just need to prove is a linearly independent set.

Ausume that and define ​.

Consider ,

, , so ,

is linearly independent, so and .

.

Why can't generalize

The property above can't be promoted to the situation of subspaces.

Consider a basis of and subspaces with basis , , , you'll find it's a counterexample!

 

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四个反向/companion 不等式(缺口坐标法) 四个“反向 / companion”不等式(按“缺口坐标”统一构造) 0) 统一记号 \(n\ge 2\)。 ...