Subelliptic and Maximal Lp Estimates for the Complex Green Operator on non-pseudoconvex domains

Abstract

We prove subelliptic estimates for ethe complex Green operator Kq at a specific level q of the ∂b -complex, defined on a not necessarily pseudoconvex CR manifold satisfying the commutator finite type condition. Additionally, we obtain maximal Lp estimates for Kq by considering closed-range estimates. Our results apply to a family of manifolds that includes a class of weak Y(q) manifolds satisfying the condition D(q) . We employ a microlocal decomposition and Calder\'on-Zygmund theory to obtain subelliptic and maximal- Lp estimates, respectively.

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