Significance of orthogonal polynomials

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Orthogonal polynomials are defined by the integral of their inner product over a specified interval equaling zero, which is a correct and complete definition. They serve as a basis in vector spaces, a key desirable quality that facilitates various applications, including simplifying least squares curve fitting without matrix inversion. While all polynomials are continuous functions, there exist non-polynomial orthogonal functions, such as Haar and Walsh functions, that are not continuous. This highlights the unique properties of orthogonal polynomials compared to other orthogonal functions. Overall, orthogonal polynomials play a significant role in mathematical applications and theoretical discussions.
lonewolf219
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Two polynomials are considered orthogonal if the integral of their inner product over a defined interval is equal to zero... is that a correct and complete definition? From what I understand, orthogonal polynomials form a basis in a vector space. Is that the desirable quality of orthogonal polynomials? Do they have any other additional properties that set them apart?
 
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Thanks rcgldr. Is it safe to say that orthogonal polynomials are continuous?
 
All polynomials are continuous functions :smile:

But there are non-polynomial orthogonal functions which are not continuous, for example Haar and Walsh functions.
 
Great! Thanks AlephZero! :smile:
 

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