Embeddings between weighted complementary local Morrey-type spaces and weighted local Morrey-type spaces

Abstract

In this paper embeddings between weighted complementary local Morrey-type spaces \,^ c\!LMpθ,ω( Rn,v) and weighted local Morrey-type spaces LMpθ,ω( Rn,v) are characterized. In particular, two-sided estimates of the optimal constant c in the inequality equation* ( ∫0∞ ( ∫B(0,t) f(x)p2v2(x)\,dx )q2p2 u2(t)\,dt)1q2 c ( ∫0∞ ( ∫\,^ c\!B(0,t) f(x)p1 v1(x)\,dx)q1p1 u1(t)\,dt)1q1 equation* are obtained, where p1,\,p2,\,q1,\,q2 ∈ (0,∞), p2 q2 and u1,\,u2 and v1,\,v2 are weights on (0,∞) and Rn, respectively. The proof is based on the combination of duality techniques with estimates of optimal constants of the embeddings between weighted local Morrey-type and complementary local Morrey-type spaces and weighted Lebesgue spaces, which reduce the problem to the solutions of the iterated Hardy-type inequalities.