8. Linear Transformations Flashcards
1
Q
Linear Transformation
A
A linear transformation between two vector spaces V and W is a map T:V->W such that the following hold
- T(v1 + v2) = T(v1) + T(v2)
- T(cv1) = cT(v1)
2
Q
F-Linear
A
Let U,V,W be F-Vector spaces and T:U→V and S:V→W be F-Linear transformations. Then SoT:U→W is F-Linear.
3
Q
Isomorphism of F-Vector Space
A
Let V and W be F-Vector Spaces. A F-Linear
transformation T: U→W is an isomorphism of F-Vector spaces if there exists a linear transformation T’:W→V with T’oT=I_v and ToT’:I_w. This T is called an inverse of T
4
Q
Uniqueness of Inverse
A
If T is an invertible linear transformation between vector spaces V and W then its inverse is unique
