- categories: Functional analysis, Definition
Dual Space The dual space of a vector space over a field , denoted or , is the set of all Linear Functionals from to .
Definition
If is a vector space over a field , then:
Each element is called a linear functional.
Properties
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Vector Space Structure: is itself a vector space over , where addition and scalar multiplication are defined pointwise:
for , , and .
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Dimension: If is finite-dimensional, . If is a basis of , then there exists a dual basis in such that:
where is the Kronecker delta.
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Evaluation Map: There exists a natural evaluation map (the double dual), defined by:
This map is an isomorphism if is finite-dimensional.
Example
For , elements of can be represented as row vectors, acting on column vectors in by matrix multiplication.