In the case of two combinatorial polynomials, we show that they can exhibited as moments of paramaterized families of orthogonal polynomials, and hence derive their Hankel transforms. Exponential Riordan arrays are the main vehicles used for this.
Eulerian polynomials as moments, via exponential Riordan arrays
Riordan arrays, orthogonal polynomials as moments, and Hankel transforms
Eulerian-Dowling Polynomials as Moments, Using Riordan Arrays
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