On algebras related to the discrete cosine transform

AbstractAn algebraic theory for the discrete cosine transform (DCT) is developed, which is analogous to the well-known theory of the discrete Fourier transform (DFT). Whereas the latter diagonalizes a convolution algebra, which is a polynomial algebra modulo a product of various cyclotomic polynomials, the former diagonalizes a polynomial algebra modulo a product of various polynomials related to the Chebyshev types. When the dimension of the algebra is a power of 2, the DCT diagonalizes a polynomial algebra modulo a product of Chebyshev polynomials of the first type. In both DFT and DCT cases, the Chinese remainder theorem plays a key role in the design of fast algorithms

The Uniform Memory Hierarchy Model of Computation

The Uniform Memory Hierarchy (UMH) model introduced in this paper captures performance-relevant aspects of the hierarchical nature of computer memory. It is used to quantify architectural requirements of several algorithms and to ratify the faster speeds achieved by tuned implementations that use improved data-movement strategies. A sequential computer's memory is modelled as a sequence hM 0 ; M 1 ; :::i of increasingly large memory modules. Computation takes place in M 0 . Thus, M 0 might model a computer's central processor, while M 1 might be cache memory, M 2 main memory, and so on. For each module M U , a bus B U connects it with the next larger module M U+1 . All buses may be active simultaneously. Data is transferred along a bus in fixed-sized blocks. The size of these blocks, the time required to transfer a block, and the number of blocks that fit in a module are larger for modules farther from the processor. The UMH model is parameterized by the rate at which the blocksizes i..