On the Fourier transform for a symmetric group homogeneous space
classification
🧮 math.RT
math.GR
keywords
transformfourierhomogeneousspaceactingadditionsderivesdimensional
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By using properties of the Young orthogonal representation, this paper derives a simple form for the Fourier transform of permutations acting on the homogeneous space of $n$-dimensional vectors, and shows that the transform requires $2n-2$ multiplications and the same number of additions.
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