Abstract
AbstractWe show that, for commutative hypergroups, the spectrum of allL1-convolution operators onLpis independent ofp∈ [1, ∞] exactly when the Plancherel measure is supported on the whole character space χb(K), i.e., exactly whenL1(K) is symmetric and for every α ∈Reiter's conditionP2holds true. Furthermore, we explicitly determine the spectra σp(Tϵ1) for the family of Karlin–McGregor polynomial hypergroups, which demonstrate that in general the spectra might even be different for eachp.
Publisher
Cambridge University Press (CUP)