On almost everywhere divergence of Bochner-Riesz means on compact Lie groups

Abstract

Let G be a connected, simply connected, compact semisimple Lie group of dimension n. It has been shown by Clerc Clerc1974 that, for any f∈ L1(G), the Bochner-Riesz mean SRδ(f) converges almost everywhere to f, provided δ>(n-1)/2. In this paper, we show that, at the critical index δ=(n-1)/2, there exists an f∈ L1(G) such that R→∞ |SR(n-1)/2(f)(x)|=∞, \ a.e.\ x∈ G. This is an analogue of a well-known result of Kolmogorov Kolmogoroff1923 for Fourier series on the circle, and a result of Stein Stein1961 for Bochner-Riesz means on the tori Tn, n≥ 2. We also study localization properties of the Bochner-Riesz mean SR(n-1)/2(f) for f∈ L1(G).