Cosine manifestations of the Gelfand transform

Abstract

The goal of the paper is to provide a detailed explanation on how the (continuous) cosine transform and the discrete(-time) cosine transform arise naturally as certain manifestations of the celebrated Gelfand transform. We begin with the introduction of the cosine convolution c, which can be viewed as an "arithmetic mean" of the classical convolution and its "twin brother", the anticonvolution. The d'Alambert property of c plays a pivotal role in establishing the bijection between (L1(G),c) and the cosine class COS(G), which turns out to be an open map if COS(G) is equipped with the topology of uniform convergence on compacta τucc. Subsequently, if G = R,Z, S1 or Zn we find a relatively simple topological space which is homeomorphic to (L1(G),c). Finally, we witness the "reduction" of the Gelfand transform to the aforementioned cosine transforms.