Embeddings and associated spaces of Copson-Lorentz spaces

Abstract

Let m,p,q∈(0,∞) and let u,v,w be nonnegative weights. We characterize validity of the inequality \[ (∫0∞ w(t) (f*(t))q \, dt ) 1q C (∫0∞ v(t) (∫t∞ u(s) (f*(s))m \,ds ) pm \! dt ) 1p \] for all measurable functions f defined on Rn and provide equivalent estimates of the optimal constant C>0 in terms of the weights and exponents. The obtained conditions characterize the embedding of the Copson-Lorentz space CLm,p(u,v), generated by the functional \[ \|f\|CLm,p(u,v) := (∫0∞ v(t) (∫t∞ u(s) (f*(s))m \,ds ) pm \! dt ) 1p, \] into the Lorentz space q(w). Moreover, the results are applied to describe the associated space of the Copson-Lorentz space CLm,p(u,v) for the full range of exponents m,p∈(0,∞).