Variation and oscillation operators on weighted Morrey-Campanato spaces in the Schr\"odinger setting
Abstract
Let L be the Schr\"odinger operator with potential V, that is, L=-+V, where it is assumed that V satisfies a reverse H\"older inequality. We consider weighted Morrey-Campanato spaces BMO L,wα ( Rd) and BLOL,wα ( Rd) in the Schr\"odinger setting. We prove that the variation operator Vσ (\Tt\t>0), σ>2, and the oscillation operator O(\Tt\t>0, \tj\j∈ Z), where tj<tj+1, j∈ Z, j→ +∞tj=+∞ and j→ -∞ tj=0, being Tt=tk∂tk e-t L, t>0, with k∈ N, are bounded operators from BMO L,wα ( Rd) into BLO L,wα ( Rd). We also establish the same property for the maximal operators defined by \tk∂tk e-t L\t>0, k∈ N.
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