Sharp estimates for pseudo-differential operators of type (1,1) on Triebel-Lizorkin and Besov spaces
Abstract
Pseudo-differential operators of type (1,1) and order m are continuous from Fps+m,q to Fps,q if s>d/(1,p,q)-d for 0<p<∞, and from Bps+m,q to Bps,q if s>d/(1,p)-d for 0<p≤∞. In this work we extend the F-boundedness result to p=∞. Additionally, we prove that the operators map F∞m,1 into bmo when s=0, and consider H\"ormander's twisted diagonal condition for arbitrary s∈R. We also prove that the restrictions on s are necessary conditions for the boundedness to hold.
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