Metadata
shorthands: {}
aliases: [Vector space homomorphism, Homomorphism of vector spaces, Linear transformation]
created: 2021-11-06 12:22:27
modified: 2022-01-10 04:13:04
are vector spaces over the same field .
is a linear map if it respects linear combinations, i.e.:
Identity map
The identity map is for which for every .
Examples
- Suppose is linear. Then is completely determined by knowing .
(Proof: If , then )
- The previous is also true for any linear map
- The functions of differentiability class defined on form a vector space, let's call it .
Then we have a map
defined by letting
(maps to the derivative of the input function)
Then is a linear map.
- Have the same as in the previous, we define
by .
Then is linear.