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Inner products in coordinate spaces
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Definition of inner/dot product on R^n
Definition of inner/dot product on C^n
The standard inner product on R^n is commutative.
The standard inner product on C^n is anticommutative.
The standard inner product on R^n commutes with (real) scalar multiplication.
The standard inner product on C^n commutes/anticommutes with scalar multiplication.
The standard inner product on R^n (or C^n) distributes over addition.
The standard inner product of a vector with itself is non-negative
The standard inner product of a vector with itself is 0 only for the 0 vector
The standard inner product on R^n can be written as the product of a vector and the transpose of a vector.
The standard inner product on C^n can be written as the product of a vector and the adjoint of a vector.
A matrix turns into its adjoint when moved to the other side of the standard inner product on C^n.
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Inner products in coordinate spaces
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The standard inner product on R^n is commutative.
Created over 8 years ago
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