5.19 ORTHOGONALITY
Orthogonality is a property of two random variables that is useful for applications such as parameter estimation (Chapter 9) and signal estimation (Chapter 11).
Definition: Orthogonal Random variables X and Y are orthogonal if 
.
This definition follows from a generalized form of orthogonal functions: two deterministic functions g1(x) and g2(x) are orthogonal if
(5.252) 
where w(x) is a positive weighting function. In our case, the weighting function is the joint pdf of X and Y, and the integration is performed over two variables:
The connections between independence, uncorrelated, and orthogonal for two random variables are described in the following theorem.
Theorem 5.10 For random variables X and Y:
- Independence implies uncorrelated:
(5.254)
- Uncorrelated and orthogonal are the same when at least one of the random variables has zero mean:
(5.255)
Proof. The proofs follow immediately from the statements.
Although uncorrelated and orthogonal are the same ...
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