Some new characterizations of BLO and Campanato spaces in the Schr\"odinger setting
Abstract
Let us consider the Schr\"odinger operator L=-+V on Rd with d≥3, where is the Laplacian operator on Rd and the nonnegative potential V belongs to certain reverse H\"older class RHs with s≥ d/2. In this paper, the authors first introduce two kinds of function spaces related to the Schr\"odinger operator L. A real-valued function f∈ L1loc( Rd) belongs to the (BLO) space BLO,θ( Rd) with 0≤θ<∞ if equation* \|f\|BLO,θ :=Q(1+r(x0))-θ(1|Q(x0,r)| ∫Q(x0,r)[f(x)-y∈Qess\,inf\,f(y)]\,dx), equation* where the supremum is taken over all cubes Q=Q(x0,r) in Rd, (·) is the critical radius function in the Schr\"odinger context. For 0<β<1, a real-valued function f∈ L1loc( Rd) belongs to the (Campanato) space Cβ,,θ( Rd) with 0≤θ<∞ if equation* \|f\|Cβ,,θ :=B(1+r(x0))-θ (1|B(x0,r)|1+β/d∫B(x0,r)[f(x)-y∈Bess\,inf\,f(y)]\,dx), equation* where the supremum is taken over all balls B=B(x0,r) in Rd. Then we establish the corresponding John--Nirenberg inequality suitable for the space BLO,θ( Rd) with 0≤θ<∞ and d≥3. Moreover, we give some new characterizations of the BLO and Campanato spaces related to L on weighted Lebesgue spaces, which is the extension of some earlier results.
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