Sharp constants related to the triangle inequality in Lorentz spaces

Abstract

We study the Lorentz spaces Lp,s(R,μ) in the range 1<p<s ∞, for which the standard functional ||f||p,s=(∫0∞ (t1/pf*(t))sdtt)1/s is only a quasi-norm. We find the optimal constant in the triangle inequality for this quasi-norm, which leads us to consider the following decomposition norm: ||f||(p,s)=∈f\Σk||fk||p,s\, where the infimum is taken over all finite representations f=Σkfk. We also prove that the decomposition norm and the dual norm ||f||p,s'= \∫R fg dμ: ||g||p',s'=1\ agree for all values p,s>1.