On Fast Algorithm for Computing Even-Length DCT

Abstract

We study recursive algorithm for computing DCT of lengths N=q 2m (m,q ∈ N, q is odd) due to C.W.Kok. We show that this algorithm has the same multiplicative complexity as theoretically achievable by the prime factor decomposition, when m ≤slant 2. We also show that C.W.Kok's factorization allows a simple conversion to a scaled form. We analyze complexity of such a scaled factorization, and show that for some lengths it achieves lower multiplicative complexity than one of known prime factor-based scaled transforms.