Carleson measures, BMO spaces and balayages associated to Schrodinger operators

Abstract

Let be a Schr\"odinger operator of the form =-+V acting on L2( Rn), n≥3, where the nonnegative potential V belongs to the reverse H\"older class Bq for some q≥ n. Let BMOL() denote the BMO space associated to the Schr\"odinger operator on . In this article we show that for every f∈ BMOL() with compact support, then there exist g∈ L∞() and a finite Carleson measure μ such that f(x)=g(x) + Sμ, P(x) with \|g\|∞ +\||μ\||c≤ C \|f\| BMOL(), where Sμ, P=∫ Rn+1+ Pt(x,y) dμ(y, t), and Pt(x,y) is the kernel of the Poisson semigroup \e-t\t> 0 on L2( Rn). Conversely, if μ is a Carleson measure, then Sμ, P belongs to the space BMOL(). This extends the result for the classical John--Nirenberg BMO space by Carleson C (see also U,GJ,W) to the BMO setting associated to Schr\"odinger operators.