Does Transforming Hermite Polynomials Affect Their Orthogonality?

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Frank Einstein
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Hello everyone.

I am working with generalized polynomial chaos. To represent a Normal random variable, the Hermite polynomials are used. However, as far as I understand, these represent N(0,1); if what I have read is correct, if I want to work with any other mean and variance, I shoud simply use the fact that Z=(X-μ)/σ and find the new polynomials (X) substituting the regular ones (Z), which would be: 1, Z, (Z2-1)... which would mean that X1= σZ-μ and X2=σ(Z2-1)-μ...

Can someone please tell me if I am right?

Thanks.
 
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Does your transformation preserve orthogonality? I would think that the requirement of orthogonality would demand zero mean...i.e. for ##i\neq j##$$<\Psi_i \Psi_j>=0$$