Characterization of functions with zero traces via the distance function and Lorentz spaces

Abstract

Consider a regular domain ⊂ RN and let d(x)=dist(x,∂). Denote L1,∞a() the space of functions from L1,∞() having absolutely continuous quasinorms. This set is essentially smaller than L1,∞() but, at the same time, essentially larger than a union of all L1,q(), q∈[1,∞). A classical result of late 1980's states that for p∈ (1,∞) and m ∈ N, u belongs to the Sobolev space Wm,p0() if and only if u/dm∈ Lp() and |∇m u|∈ Lp(). During the consequent decades, several authors have spent considerable effort in order to relax the characterizing condition. Recently, it was proved that u∈ Wm,p0() if and only if u/dm∈ L1() and |∇m u|∈ Lp(). In this paper we show that for N≥1 and p∈(1,∞) we have u∈ W1,p0() if and only if u/d∈ L1,∞a() and |∇ u|∈ Lp(). Moreover, we present a counterexample which demonstrates that after relaxing the condition u/d∈ L1,∞a() to u/d∈ L1,∞() the equivalence no longer holds.